A Comprehensive Review on Development and Applications of Cross-Flow Wind Turbines

The rapid globalization of the energy crisis and the adverse effects of global warming have caused the need for non-conventional energy resources to be felt more than ever. As a result of this, vertical axis wind turbines (VAWT) have received much attention over the recent decades, and have thus been more developed and used worldwide. The cross-flow wind turbine (CFWT) is a wind turbine in the category of VAWTs, and perfectly suitable for urban applications due to its simplicity, high starting torque at low wind speed, and self-starting capability, even though its low power coefficient as its main drawback has slowed down its widespread use so far. The main aim of this paper is to review the scientific literature and recent developments in the field of CFWTs. The governing equations and turbulence models for the simulation of the turbine are discussed and various wind resource assessment methods for estimating potential site locations, different aspects, and wind energy harvesting systems from buildings are debated. The research gaps, challenges, and future possible works on such turbines and their applications are discussed. Investigations indicate that changing the rotor geometric parameters and adding innovative augmentation devices have been the most widely addressed approaches for making performance enhancement of the wind turbine in the literature. The critical performance-affecting parameters are improved by various innovative designs of the turbine structure or blades, as well as several augmentation techniques, such as guide nozzle, casing, windshield, guide vane, deflector, cowling, etc.


Opening
For decades, the electric power supply has relied heavily on fossil fuels. Environmental pollution, limited sources of these fuels, and increasing energy demand have caused human concerns [1,2]. According to the predictions, fossil fuels will no longer be able to meet the growing energy demand. Due to the limited fossil fuel resources, their cost will also increase. Constant consumption of this type of energy will lead to an increase in environmental pollutants [3,4]; for example, three billion people still use polluting fuels and technologies for cooking, which leads to carbon dioxide production in their home environment [5]. In addition, the growing body of evidence shows this pollution directly correlates with adverse pregnancy outcomes and tuberculosis, with 3.8 million deaths annually [6][7][8]. Hence, the international community has recognized a comprehensive assessment of the user experience, health effects, and barriers to adopting improved energy to better energy sources [9]. Renewable energies can be a reliable solution to these problems [10], which are widely applicable in three main fields of thermal, transportation, Wind energy can be captured by using wind turbines (WT), which are divided into two main categories based on the turbine's rotational axis: VAWT and horizontal axis wind turbine (HAWT) [14]. HAWTs with lift-type rotors perform better than VAWTs in terms of torque and power. The drag-type rotors of VAWTs produce lower performance values, but they are cost-effective, easy to start, and operate at lower wind speeds [20][21][22][23]. In the past, the most common type of turbine was large-scale HAWTs in wind farms [24]. However, in recent years, many studies have been conducted with the aim of harvesting wind energy from urban and semi-urban areas, showing that VAWTs perform better than HAWTs [25,26]. In fact, due to the wind characteristics in the urban environment and the advantages of VAWTs, such as low cost, noise and vibration, insensitivity to wind direction, visual impact, and public safety, these turbines are more attractive in urban and semi-urban areas [27,28]. One type of VAWT is the CFWT, which is very similar to the Savonius turbine geometrically [29]. The maximum theoretical efficiency of CFWTs is around 12-15% [30], while the efficiency of the Darrieus turbine, another type of VAWT, is about 35%. HAWTs' maximum efficiency could be as high as 45% [31].

Motivation and Article Structure
As shown in Table 1, many papers have already reviewed different types of VAWTs, except for CFWTs. The main reason behind this could be the low efficiency of CFWTs, depriving them of the central attention of research works as a promising energy technology. However, researchers have recently become more aware of the positive side of CFWTs, such as their high starting torque at low wind speed, low noise, being environmentally friendly, simplicity, reliability, and low costs, which make them suitable for small applications in areas with low wind speed, e.g., urban areas [32]. That is why many experimental and simulation studies have been done on them in recent years to make them more efficient and feasible. Therefore, there must be a review article presenting the latest findings and advances in this field and the further remaining gaps. Wind energy can be captured by using wind turbines (WT), which are divided into two main categories based on the turbine's rotational axis: VAWT and horizontal axis wind turbine (HAWT) [14]. HAWTs with lift-type rotors perform better than VAWTs in terms of torque and power. The drag-type rotors of VAWTs produce lower performance values, but they are cost-effective, easy to start, and operate at lower wind speeds [20][21][22][23]. In the past, the most common type of turbine was large-scale HAWTs in wind farms [24]. However, in recent years, many studies have been conducted with the aim of harvesting wind energy from urban and semi-urban areas, showing that VAWTs perform better than HAWTs [25,26]. In fact, due to the wind characteristics in the urban environment and the advantages of VAWTs, such as low cost, noise and vibration, insensitivity to wind direction, visual impact, and public safety, these turbines are more attractive in urban and semi-urban areas [27,28]. One type of VAWT is the CFWT, which is very similar to the Savonius turbine geometrically [29]. The maximum theoretical efficiency of CFWTs is around 12-15% [30], while the efficiency of the Darrieus turbine, another type of VAWT, is about 35%. HAWTs' maximum efficiency could be as high as 45% [31].

Motivation and Article Structure
As shown in Table 1, many papers have already reviewed different types of VAWTs, except for CFWTs. The main reason behind this could be the low efficiency of CFWTs, depriving them of the central attention of research works as a promising energy technology. However, researchers have recently become more aware of the positive side of CFWTs, such as their high starting torque at low wind speed, low noise, being environmentally friendly, simplicity, reliability, and low costs, which make them suitable for small applications in areas with low wind speed, e.g., urban areas [32]. That is why many experimental and simulation studies have been done on them in recent years to make them more efficient and feasible. Therefore, there must be a review article presenting the latest findings and advances in this field and the further remaining gaps. Table 1. Review papers in the field of VAWT.

Author
Year Highlight Tjiu et al. [33] 2015 Assessment of Darrieus configurations, including the drawbacks of each variation that kept them from being developed into large-scale rotors.
Alom and Saha [29] 2019 A comprehensive and systematic review of Savonius rotor blade profiles and shapes. Tasneem et al. [34] 2020 Description of the state of urban wind farm technology and its different aspects.
Rajpar et al. [35] 2021 Development in the design and optimization techniques of wind deflectors for VAWTs.
Dewan et al. [36] 2021 Effect of various performance-influencing parameters and advances in the power augmentation techniques used for S-type Savonius rotors. Karmakar and Chattopadhyay [37] 2022 A review of augmentation methods to increase the performance of VAWTs. Cuevas-Carvajal et al. [38] 2022 Evaluating the effect of geometrical parameters on the performance of Savonius.
The main purpose of this paper is to categorize different methods for designing and improving the performance of CFWTs. For this, two approaches have been used: first, changing the rotor's geometric characteristics, and second, designing and adding the augmentation devices. Moreover, this article describes the applications, aspects, and challenges of CFWTs in urban and non-urban environments. The paper will pave the way for future research by answering the following questions: • What was the history and evolution of the cross-flow rotor (CFR)? • What are the features and applications of CFWTs? • What are the performance improvement methods and common modeling strategies? • What features and aspects make CFWTs attractive for harvesting energy in urban environments? • What is the necessity to find a suitable site location?

Research Methodology and Analysis
A systematic literature search consisting of three steps, depicted in Figure 2, was applied to create a database of relevant publications. In the first step, the initial search was performed with two main keywords throughout the text on four search platforms. Search engines are unable to distinguish terms such as "crossflow", "cross flow", and "cross-flow". Therefore, all terms were added to the query string with the logical operators (AND and OR). Many results from the searching step were irrelevant; thus, items such as datasets, reports, patents, books, book chapters, and policy documents were filtered in the second step.
Additionally, duplicate articles were removed and the initial keywords were considered for searching in the title, abstract, and keywords. Search results with different keywords and domains in three platforms can be seen in Table 2. In the last step, the text of the articles needed to be examined more thoroughly to be logically compatible with the purpose of this review paper. The backward, forward, and author citation searches were used to find articles with different keywords to reach the final database.
It should be noted that the analysis of the gathered publications was done in the bibliometric analysis step. Its purpose was to use keywords co-occurrence evaluation to identify relevant secondary keywords. This evaluation was done with VOSviewer, a text mining software for constructing and visualizing bibliometric networks. All words in the title, abstract, and keywords in the gathered publications were extracted from Scopus and Web of Science and were filtered by considering a minimum of three occurrences based on co-occurrence analyses. Figure 3 illustrates the network visualization of the co-occurrence map of the keywords. 111 and 183 articles were evaluated in Figure 3a,b, respectively. The size of the circles is based on the weight of the word repetition during the article evaluation process. The lines indicate the relationship between the two terms used in an article, and different colors indicate clustering (thematic classification). As can be seen, the words 2644 45 4 (("Cross-flow" OR "Cross flow" OR "Crossflow" OR "Banki") AND "wind turbine") AND "Vertical axis" AND "power coefficient" AND "performance" All field Topic 14 14 291 16 1164 17 It should be noted that the analysis of the gathered publications was done in the bibliometric analysis step. Its purpose was to use keywords co-occurrence evaluation to identify relevant secondary keywords. This evaluation was done with VOSviewer, a text mining software for constructing and visualizing bibliometric networks. All words in the title,  Table 2. Search results in three platforms based on initial and secondary keywords (Topic = title, abstract, keywords) (The starred results will be used in the publications trend analysis). 2644 45 4 (("Cross-flow" OR "Cross flow" OR "Crossflow" OR "Banki") AND "wind turbine") AND "Vertical axis" AND "power coefficient" AND "performance" All field Topic 14 14 291 16 1164 17 There is an analysis to determine the historical development and trends of publications related to this field (the second row with * in Table 2). Figure 4 illustrates the number of publications based on every five-year period from 1998 to 2022 on the three platforms. This figure indicates that the number of publications has continuously increased, and more than 60% of the papers have been published only in the last ten years. This analysis finds the Sustainability 2023, 15, 4679 5 of 39 importance of this topic in recent years and the significant requirement of a review paper in this field. abstract, and keywords in the gathered publications were extracted from Scopus and Web of Science and were filtered by considering a minimum of three occurrences based on cooccurrence analyses. Figure 3 illustrates the network visualization of the co-occurrence map of the keywords. 111 and 183 articles were evaluated in Figure 3a,b, respectively. The size of the circles is based on the weight of the word repetition during the article evaluation process. The lines indicate the relationship between the two terms used in an article, and different colors indicate clustering (thematic classification). As can be seen, the words WT, VAWT, performance, and CP were the most frequent and were considered secondary keywords.
(a) (b) There is an analysis to determine the historical development and trends of publications related to this field (the second row with * in Table 2). Figure 4 illustrates the number of publications based on every five-year period from 1998 to 2022 on the three platforms. This figure indicates that the number of publications has continuously increased, and more than 60% of the papers have been published only in the last ten years. This analysis finds the importance of this topic in recent years and the significant requirement of a review paper in this field.

Classification of WTs
WTs could be classified from different perspectives. As Figure 5 demonstrates, the classification could be based on the method of turbine action (aerodynamic force), the location where the turbine is placed, the way the speed of the turbine is managed, and last but not least, the configuration of the turbine about the axis of rotation. Regarding how the aerodynamic force acts on the turbine, one could say that WTs may be designed to act based on the drag force, lift force, or a combination of these two from the airflow. Ancient windmills were mainly built based on drag force action, while modern large-scale WTs rely on a very high lift force rather than a drag force (a high lift-to-drag ratio, up to 200). WTs can be erected either onshore or offshore; where for the latter the higher wind power over open waters (oceans) with a higher energy density could be taken advantage of. Constant speed WTs always rotate at the same generator/rotor speed, regardless of the wind speed changes. Thus, the tip speed ratio (TSR) changes, and the WT will have optimal aerodynamic performance only at a particular wind speed. Variable speed WTs allow the generator/rotor speed to change proportionally to the wind speed between the cut-in and rated speed. As a result, the TSR and the performance remain at an optimum point [39].
For the latter point, WTs could be either VAWTs, HAWTs, cross-axis wind turbines (CAWT), or bladeless. VAWTs and HAWTs have a vertical and horizontal blade rotation axis, respectively. However, a new experimental cross-linked turbine called CAWT is made by combining these two types of blades (three vertical and six horizontal), allowing to capture wind energy from both vertical and horizontal directions [40,41]. The bladeless turbines, which generate electricity by vibrating mechanisms, are still under development and are a little bit unknown. Notwithstanding they have low power efficiency, they are cost-efficient [42]. Some turbines do not fit into the above categories; for instance, IN-VELOX, IMPLUX, Cooling tower updraft, and Kite that do not have a rotating axis, and O-Wing that has a variable rotating axis.

Classification of WTs
WTs could be classified from different perspectives. As Figure 5 demonstrates, the classification could be based on the method of turbine action (aerodynamic force), the location where the turbine is placed, the way the speed of the turbine is managed, and last but not least, the configuration of the turbine about the axis of rotation. Regarding how the aerodynamic force acts on the turbine, one could say that WTs may be designed to act based on the drag force, lift force, or a combination of these two from the airflow. Ancient windmills were mainly built based on drag force action, while modern large-scale WTs rely on a very high lift force rather than a drag force (a high lift-to-drag ratio, up to 200). WTs can be erected either onshore or offshore; where for the latter the higher wind power over open waters (oceans) with a higher energy density could be taken advantage of. Constant speed WTs always rotate at the same generator/rotor speed, regardless of the wind speed changes. Thus, the tip speed ratio (TSR) changes, and the WT will have optimal aerodynamic performance only at a particular wind speed. Variable speed WTs allow the generator/rotor speed to change proportionally to the wind speed between the cut-in and rated speed. As a result, the TSR and the performance remain at an optimum point [39].
For the latter point, WTs could be either VAWTs, HAWTs, cross-axis wind turbines (CAWT), or bladeless. VAWTs and HAWTs have a vertical and horizontal blade rotation axis, respectively. However, a new experimental cross-linked turbine called CAWT is made by combining these two types of blades (three vertical and six horizontal), allowing to capture wind energy from both vertical and horizontal directions [40,41]. The bladeless turbines, which generate electricity by vibrating mechanisms, are still under development and are a little bit unknown. Notwithstanding they have low power efficiency, they are costefficient [42]. Some turbines do not fit into the above categories; for instance, INVELOX, IMPLUX, Cooling tower updraft, and Kite that do not have a rotating axis, and O-Wing that has a variable rotating axis.
Two well-known types of VAWTs are Darrieus and Savonius [43,44]. Figure 6 shows different types of Darrieus. For the first time in 1926, Georges Darrieus invented his turbine designs (Phi-rotor and Giromill) [45], which rotate by the lift force generated in the blades [46] and have a theoretical efficiency of about 40% [31]. The Savonius was invented by Sigurd Savonius in 1929 [47] and consists of at least two half-cylinders. As shown in Figure 7, the drag force in the concave part of the blades is more than the one in the convex part, which causes the turbine to rotate around its axis. C P,max in Savonius is only around 15% [30]; thus, its efficiency is lower than Darrieus, but it has a good starting torque at low wind speed [32]. Two well-known types of VAWTs are Darrieus and Savonius [43,44]. Figure 6 shows different types of Darrieus. For the first time in 1926, Georges Darrieus invented his turbine designs (Phi-rotor and Giromill) [45], which rotate by the lift force generated in the blades [46] and have a theoretical efficiency of about 40% [31]. The Savonius was invented by Sigurd Savonius in 1929 [47] and consists of at least two half-cylinders. As shown in Figure 7, the drag force in the concave part of the blades is more than the one in the convex part, which causes the turbine to rotate around its axis. CP,max in Savonius is only around 15% [30]; thus, its efficiency is lower than Darrieus, but it has a good starting torque at low wind speed [32].   Two well-known types of VAWTs are Darrieus and Savonius [43,44]. Figure 6 shows different types of Darrieus. For the first time in 1926, Georges Darrieus invented his turbine designs (Phi-rotor and Giromill) [45], which rotate by the lift force generated in the blades [46] and have a theoretical efficiency of about 40% [31]. The Savonius was invented by Sigurd Savonius in 1929 [47] and consists of at least two half-cylinders. As shown in Figure 7, the drag force in the concave part of the blades is more than the one in the convex part, which causes the turbine to rotate around its axis. CP,max in Savonius is only around 15% [30]; thus, its efficiency is lower than Darrieus, but it has a good starting torque at low wind speed [32].  One of the sub-branches of Savonius is the CFWT, which is geometrically similar [29]. Also, CFWTs can be installed and operated on two vertical and horizontal axis modes, so they are classified as HAWTs and VAWTs. Small-scale wind turbines (SSWTs) have a capacity of up to 16 kW and rotor diameter between 0.5 to 10 m [48]. A CFWT with 500 watts nominal power capacity produces 3.2 MWh/year at a maximum wind speed of 11.5 m/s [49][50][51]; therefore, CFWTs can be counted as an SSWT. One of the sub-branches of Savonius is the CFWT, which is geometrically similar [29]. Also, CFWTs can be installed and operated on two vertical and horizontal axis modes, so they are classified as HAWTs and VAWTs. Small-scale wind turbines (SSWTs) have a capacity of up to 16 kW and rotor diameter between 0.5 to 10 m [48]. A CFWT with Sustainability 2023, 15, 4679 8 of 39 500 watts nominal power capacity produces 3.2 MWh/year at a maximum wind speed of 11.5 m/s [49][50][51]; therefore, CFWTs can be counted as an SSWT.

Governing Equations and Turbulence Models
The governing equations are given by the Incompressible Navier-Stokes equation for rotating objects (relative velocity), including the conservation of mass and momentum equations, as given in Equations (1) and (2).
In Equation (2), two acceleration terms represent rotation. These terms include the Coriolis acceleration and the centripetal acceleration, which are defined by 2 p is the static pressure, τ is the stress tensor, and → F refers to external body forces. τ is given by: I, the unit tensor, refers to the effect of volume dilation. According to the approximations required to solve the turbulent stress equations, various turbulence models have been developed in the past. Each model offers different advantages according to the operating conditions for which it has been developed [52]. However, the simplest complete turbulence models for rotating airfoil problems are realizable k- conical surfaces promote turbulent mixing above and below, the stator back pressure is reduced, and the WT power output is increased. The simulation results showed that the average CP and CT increased by about 30% to 35% compared to turbines without ODGV.

Zephyr
A zephyr consists of 9 blades placed around the CFWT, as illustrated in Figure 25. Due to the special shape of its blades, the zephyr reduces the flow turbulence and changes the direction of wind flow to a certain angle so that the CFWT can absorb more energy. A CFD simulation using k-ɛ turbulence model and WTE shows that the zephyr can increase the CP from 0.098 to 0.12 [154,155].

The Importance of a Suitable Site Location
Site location is the essential and primary factor for understanding the wind behavior, selecting WTs' type and scale, designing the wind farms (WF), and measuring their effectiveness [156]. Figure 26 shows some of the best urban and non-urban WF locations. Before starting the construction of a WF, it is necessary to perform the WRA [157,158] to estimate the potential locations and identify wind characteristics accurately. The widely used methods of WRA include measurement [159], measure-correlate-predict [160], wind atlas methodology [161], Mesoscale modelling [162], and combined Mesoscale-Microscale modelling [163]. Also, in WRA, the uncertainty in the data that affects the WT output and capital expense (CAPEX) must be considered [158,164,165]. The choice of turbine type and k-ω SST. Both models introduce two transport equations: first, the turbulence kinetic energy (k), and second, specific dissipation rate (ω) in the k-ω SST model or dissipation rate (ε) in the realizable k- conical surfaces promote turbulent mixing above and below, the stator back pressure is reduced, and the WT power output is increased. The simulation results showed that the average CP and CT increased by about 30% to 35% compared to turbines without ODGV.

Zephyr
A zephyr consists of 9 blades placed around the CFWT, as illustrated in Figure 25. Due to the special shape of its blades, the zephyr reduces the flow turbulence and changes the direction of wind flow to a certain angle so that the CFWT can absorb more energy. A CFD simulation using k-ɛ turbulence model and WTE shows that the zephyr can increase the CP from 0.098 to 0.12 [154,155].

The Importance of a Suitable Site Location
Site location is the essential and primary factor for understanding the wind behavior, selecting WTs' type and scale, designing the wind farms (WF), and measuring their effectiveness [156]. Figure 26 shows some of the best urban and non-urban WF locations. Before starting the construction of a WF, it is necessary to perform the WRA [157,158] to estimate the potential locations and identify wind characteristics accurately. The widely used methods of WRA include measurement [159], measure-correlate-predict [160], wind atlas methodology [161], Mesoscale modelling [162], and combined Mesoscale-Microscale modelling [163]. Also, in WRA, the uncertainty in the data that affects the WT output and capital expense (CAPEX) must be considered [158,164,165]. The choice of turbine type conical surfaces promote turbulent mixing above and below, the stator back pressure is reduced, and the WT power output is increased. The simulation results showed that the average CP and CT increased by about 30% to 35% compared to turbines without ODGV.

Zephyr
A zephyr consists of 9 blades placed around the CFWT, as illustrated in Figure 25. Due to the special shape of its blades, the zephyr reduces the flow turbulence and changes the direction of wind flow to a certain angle so that the CFWT can absorb more energy. A CFD simulation using k-ɛ turbulence model and WTE shows that the zephyr can increase the CP from 0.098 to 0.12 [154,155].

The Importance of a Suitable Site Location
Site location is the essential and primary factor for understanding the wind behavior, selecting WTs' type and scale, designing the wind farms (WF), and measuring their effectiveness [156]. Figure 26 shows some of the best urban and non-urban WF locations. Before starting the construction of a WF, it is necessary to perform the WRA [157,158] to estimate the potential locations and identify wind characteristics accurately. The widely used methods of WRA include measurement [159], measure-correlate-predict [160], wind atlas methodology [161], Mesoscale modelling [162], and combined Mesoscale-Microscale modelling [163]. Also, in WRA, the uncertainty in the data that affects the WT output and capital expense (CAPEX) must be considered [158,164,165]. The choice of turbine type is a semi-empirical two-equation turbulence model that significantly differs from the standard k- conical surfaces promote turbulent mixing above and below, the stator back pressure is reduced, and the WT power output is increased. The simulation results showed that the average CP and CT increased by about 30% to 35% compared to turbines without ODGV.

Zephyr
A zephyr consists of 9 blades placed around the CFWT, as illustrated in Figure 25. Due to the special shape of its blades, the zephyr reduces the flow turbulence and changes the direction of wind flow to a certain angle so that the CFWT can absorb more energy. A CFD simulation using k-ɛ turbulence model and WTE shows that the zephyr can increase the CP from 0.098 to 0.12 [154,155].

The Importance of a Suitable Site Location
Site location is the essential and primary factor for understanding the wind behavior, selecting WTs' type and scale, designing the wind farms (WF), and measuring their effectiveness [156]. Figure 26 shows some of the best urban and non-urban WF locations. Before starting the construction of a WF, it is necessary to perform the WRA [157,158] to estimate the potential locations and identify wind characteristics accurately. The widely used methods of WRA include measurement [159], measure-correlate-predict [160], wind atlas methodology [161], Mesoscale modelling [162], and combined Mesoscale-Microscale modelling [163]. Also, in WRA, the uncertainty in the data that affects the WT output and capital expense (CAPEX) must be considered [158,164,165]. The choice of turbine type model proposed by Launder and Spalding [53] in two respects: realizable k- conical surfaces promote turbulent mixing above and below, the stator back pressure is reduced, and the WT power output is increased. The simulation results showed that the average CP and CT increased by about 30% to 35% compared to turbines without ODGV.

Zephyr
A zephyr consists of 9 blades placed around the CFWT, as illustrated in Figure 25. Due to the special shape of its blades, the zephyr reduces the flow turbulence and changes the direction of wind flow to a certain angle so that the CFWT can absorb more energy. A CFD simulation using k-ɛ turbulence model and WTE shows that the zephyr can increase the CP from 0.098 to 0.12 [154,155].

The Importance of a Suitable Site Location
Site location is the essential and primary factor for understanding the wind behavior, selecting WTs' type and scale, designing the wind farms (WF), and measuring their effectiveness [156]. Figure 26 shows some of the best urban and non-urban WF locations. Before starting the construction of a WF, it is necessary to perform the WRA [157,158] to estimate the potential locations and identify wind characteristics accurately. The widely used methods of WRA include measurement [159], measure-correlate-predict [160], wind atlas methodology [161], Mesoscale modelling [162], and combined Mesoscale-Microscale modelling [163]. Also, in WRA, the uncertainty in the data that affects the WT output and capital expense (CAPEX) must be considered [158,164,165]. The choice of turbine type contains a different eddy-viscosity formulation and employs a modified transport equation to express the dissipation rate. It means that the eddy-viscosity coefficient (C µ ) is a function of local flow parameters; nonetheless, it is constant in the standard k-

Zephyr
A zephyr consists of 9 blades pl Due to the special shape of its blades, t the direction of wind flow to a certain CFD simulation using k-ɛ turb increase the CP from 0.098 to 0.12 [154

The Importance of a Suitable Site Loc
Site location is the essential and p selecting WTs' type and scale, designi tiveness [156]. Figure 26 shows some fore starting the construction of a W estimate the potential locations and id used methods of WRA include measu atlas methodology [161], Mesoscale m modelling [163]. Also, in WRA, the un capital expense (CAPEX) must be co conical surfaces promote turbulent mixing above and below, the stator back pressure is reduced, and the WT power output is increased. The simulation results showed that the average CP and CT increased by about 30% to 35% compared to turbines without ODGV.

Zephyr
A zephyr consists of 9 blades placed around the CFWT, as illustrated in Figure 25. Due to the special shape of its blades, the zephyr reduces the flow turbulence and changes the direction of wind flow to a certain angle so that the CFWT can absorb more energy. A CFD simulation using k-ɛ turbulence model and WTE shows that the zephyr can increase the CP from 0.098 to 0.12 [154,155].

The Importance of a Suitable Site Location
Site location is the essential and primary factor for understanding the wind behavior, selecting WTs' type and scale, designing the wind farms (WF), and measuring their effectiveness [156]. Figure 26 shows some of the best urban and non-urban WF locations. Before starting the construction of a WF, it is necessary to perform the WRA [157,158] to estimate the potential locations and identify wind characteristics accurately. The widely used methods of WRA include measurement [159], measure-correlate-predict [160], wind atlas methodology [161], Mesoscale modelling [162], and combined Mesoscale-Microscale modelling [163]. Also, in WRA, the uncertainty in the data that affects the WT output and has become increasingly popular in the CFD community due to its reasonable accuracy, improved performance, and economy. It is recommended for rotating objects and free shear layer flows [54].
The transport equations for k and ε are: where, In these equations, G k and G b are the turbulence kinetic energy generation due to the mean velocity gradients and buoyancy, respectively. Likewise, they are calculated similarly to the standard k-(c)

Zephyr
A zephyr consists of 9 blades placed around the CFWT, as illustrated in Figure 25. Due to the special shape of its blades, the zephyr reduces the flow turbulence and changes the direction of wind flow to a certain angle so that the CFWT can absorb more energy. A CFD simulation using k-ɛ turbulence model and WTE shows that the zephyr can increase the CP from 0.098 to 0.12 [154,155].

The Importance of a Suitable Site Location
Site location is the essential and primary factor for understanding the wind behavior, selecting WTs' type and scale, designing the wind farms (WF), and measuring their effectiveness [156]. Figure 26 shows some of the best urban and non-urban WF locations. Before starting the construction of a WF, it is necessary to perform the WRA [157,158] to estimate the potential locations and identify wind characteristics accurately. The widely used methods of WRA include measurement [159], measure-correlate-predict [160], wind atlas methodology [161], Mesoscale modelling [162], and combined Mesoscale-Microscale modelling [163]. Also, in WRA, the uncertainty in the data that affects the WT output and capital expense (CAPEX) must be considered [158,164,165]. The choice of turbine type model. Y M is the contribution of the fluctuating dilatation in compressible turbulence to the overall dissipation rate, M t is the turbulent Mach number, µ t is the turbulent dynamics viscosity, S k and S ε are user-defined source terms, and σ (c) Figure 24. (a) Views and dimensions of the fab angle, (c) Shapes of ODGV blade.

Zephyr
A zephyr consists of 9 blades placed Due to the special shape of its blades, the z the direction of wind flow to a certain ang CFD simulation using k-ɛ turbulen increase the CP from 0.098 to 0.12 [154,155]

The Importance of a Suitable Site Location
Site location is the essential and prima selecting WTs' type and scale, designing th tiveness [156]. Figure 26 shows some of th fore starting the construction of a WF, it estimate the potential locations and ident used methods of WRA include measureme atlas methodology [161], Mesoscale model modelling [163]. Also, in WRA, the uncerta capital expense (CAPEX) must be consid and σ k are the turbulent Prandtl numbers for ε and k, respectively. Other parameters are: The constants values are: A 0 = 4.04, C 1 Sustainability 2023, 15, x FOR PEER REVIEW 2 conical surfaces promote turbulent mixing above and below, the stator back press reduced, and the WT power output is increased. The simulation results showed th average CP and CT increased by about 30% to 35% compared to turbines without O

Zephyr
A zephyr consists of 9 blades placed around the CFWT, as illustrated in Figu Due to the special shape of its blades, the zephyr reduces the flow turbulence and ch the direction of wind flow to a certain angle so that the CFWT can absorb more ene CFD simulation using k-ɛ turbulence model and WTE shows that the zeph increase the CP from 0.098 to 0.12 [154,155].

The Importance of a Suitable Site Location
Site location is the essential and primary factor for understanding the wind beh selecting WTs' type and scale, designing the wind farms (WF), and measuring their tiveness [156]. Figure 26 shows some of the best urban and non-urban WF location fore starting the construction of a WF, it is necessary to perform the WRA [157,1 estimate the potential locations and identify wind characteristics accurately. The w used methods of WRA include measurement [159], measure-correlate-predict [160] atlas methodology [161], Mesoscale modelling [162], and combined Mesoscale-Micr modelling [163]. Also, in WRA, the uncertainty in the data that affects the WT outp capital expense (CAPEX) must be considered [158,164,165]. The choice of turbin = 1.44, C 2 = 1.9, σ k = 1.0, and σ ε = 1.2. The standard k-ω model is based on the Wilcox k-ω model [55], which predicts free shear flow spreading rates and agrees with measurements for far wakes, mixing layers, and radial, plane, and round jets. Nevertheless, it is very sensitive to free flow. The k-ω SST model, which was developed by Menter [56,57], is a combination of the k-ω model in near-wall regions and the k- conical surfaces promote turbulent mixing above and below, the stator back pressure is reduced, and the WT power output is increased. The simulation results showed that the average CP and CT increased by about 30% to 35% compared to turbines without ODGV.

Zephyr
A zephyr consists of 9 blades placed around the CFWT, as illustrated in Figure 25. Due to the special shape of its blades, the zephyr reduces the flow turbulence and changes the direction of wind flow to a certain angle so that the CFWT can absorb more energy. A CFD simulation using k-ɛ turbulence model and WTE shows that the zephyr can increase the CP from 0.098 to 0.12 [154,155].

The Importance of a Suitable Site Location
Site location is the essential and primary factor for understanding the wind behavior, selecting WTs' type and scale, designing the wind farms (WF), and measuring their effectiveness [156]. Figure 26 shows some of the best urban and non-urban WF locations. Before starting the construction of a WF, it is necessary to perform the WRA [157,158] to estimate the potential locations and identify wind characteristics accurately. The widely used methods of WRA include measurement [159], measure-correlate-predict [160], wind atlas methodology [161], Mesoscale modelling [162], and combined Mesoscale-Microscale model outside the boundary layer. In other words, the k-ω SST model only benefits from the k-ω and the k-Sustainability 2023, 15, x FOR PEER REVIEW conical surfaces promote turbulent mixing above and below, the stator bac reduced, and the WT power output is increased. The simulation results sho average CP and CT increased by about 30% to 35% compared to turbines with

Zephyr
A zephyr consists of 9 blades placed around the CFWT, as illustrated Due to the special shape of its blades, the zephyr reduces the flow turbulence the direction of wind flow to a certain angle so that the CFWT can absorb mo CFD simulation using k-ɛ turbulence model and WTE shows that the increase the CP from 0.098 to 0.12 [154,155].

The Importance of a Suitable Site Location
Site location is the essential and primary factor for understanding the wi selecting WTs' type and scale, designing the wind farms (WF), and measurin tiveness [156]. Figure 26 shows some of the best urban and non-urban WF l fore starting the construction of a WF, it is necessary to perform the WRA estimate the potential locations and identify wind characteristics accurately used methods of WRA include measurement [159], measure-correlate-predic models. These features make the k-ω SST model more reliable and accurate than a standard k-ω model for wider types of flow (e.g., low-pressure gradient flows, airfoils, and ultrasonic shock waves). The k-ω SST mode equations are expressed as: The auxiliary relations are written as below: The empirical constants of the k-ω SST model are: β * = 0.09, β 1 = 0.075, β 2 = 0.0828, γ 1 = 0.5532, γ 2 = 0.4404, σ k1 = 0.85, σ k2 = 1.0, σ ω1 = 0.5, σ ω2 = 0.856, and a 1 = 0.31.
Specific tip speed ratio (TSR or λ) measures the linear velocity of the blade tip (U) against the wind speed (V). It is given as [58]: The auxiliary relations are written as below: * = (22) The empirical constants of the k-ω SST model are: Specific tip speed ratio (TSR or λ) measures the linear velocity of the blade tip (U) against the wind speed (V). It is given as [58]: N is the rotational speed. The relationship between total wind power (PW) and wind speed (V) is: In WTs, the wind hits the blades and rotates them around the turbine axis. As a result, the generator connected to this axis generates AC power. The general relationship between wind power and turbine power is established by a factor called CP, a variable parameter with wind direction (α), and TSR. Theoretically, the maximum CP can be up to the Betz limit of 59.3% [59]. This relationship is shown in Equation (32), and the CT is calculated according to Equation (33) [60].
The CP and CT are the main parameters that define the turbine performance related to the TSR.
N is the rotational speed. The relationship between total wind power (P W ) and wind speed (V) is: In WTs, the wind hits the blades and rotates them around the turbine axis. As a result, the generator connected to this axis generates AC power. The general relationship between wind power and turbine power is established by a factor called C P , a variable parameter with wind direction (α), and TSR. Theoretically, the maximum C P can be up to the Betz limit of 59.3% [59]. This relationship is shown in Equation (32), and the C T is calculated according to Equation (33) [60].
The C P and C T are the main parameters that define the turbine performance related to the TSR.
According to Equation (35), the aspect ratio is defined as the ratio of rotor height to rotor diameter [61].
Other parameters in this field include the angle of attack, cut-in speed, and cut-off speed. The angle of attack defines as the angle between the chord line and the wind velocity vector [62]. Cut-in speed is the minimum wind speed at which the turbine starts to spin. Similarly, cut-off speed is the maximum wind speed that the turbine operates at. If the wind speed exceeds this limit, the turbine blades will stop, and no power will be generated to prevent damage or failure [61].

History of CFR
A CFR is used in fans, hydro turbines, and WTs. The first written and recorded type of CFR can be traced back to a particular invention, the Cross-Flow Fan (CFF), in 1891 by Paul Mortier with patent number 215,662 in France. Then, it was registered in the United States [61] by correspondence. The main purpose was to utilize mine ventilation. Still, for two decades, the CFF was overlooked, took enough attention, and was left under the shadow beneath the development of axial flow fans.
There was a re-emergence of interest in the late 1920s and early 1930s, with a variety of industrial inventions in different applications such as drying grain [63], air conditioning [64,65], and injecting pulverized fuel into furnaces [66,67]. Nevertheless, the main advancement of CFF design began with detailed studies into their behavior in the late 1930s. Currently, CFFs are widely used in air conditioners, air curtains, household heaters, automotive air conditioning, ventilation, vertical take-off and landing aircraft, unmanned aerial vehicles, and underwater fan-wing vehicles due to their large capacity of mass flow and size compactness.
Meanwhile, Anthony Michell designed the Cross-Flow Hydro Turbine (CFHT) in 1903, and Donat Banki found his theoretical approach, which later registered his idea in 1922 [68]. At the same time, Fritz Ossberger developed Michell's design and patented it [69], [70]. Therefore, CFHT generally has been recognized as the Banki-Michell turbine or the Ossberger turbine. Several studies have been performed to optimize and enhance the CFHT efficiency and most application of the CFHT is used in hydropower plants.
In the early 21st century, several researchers [71][72][73] suggested that CFR could be used to absorb wind energy as a CFWT. However, about two decades earlier, Japanese researchers [74][75][76][77][78][79][80] made great efforts to determine the fluid flow characteristics around a CFWT. The growing demand for electricity and the benefits and applications of CFWTs led to much research in recent years to develop and improve their efficiency, C P , and C T .

Working Principle and Applications of CFWT
As shown in Figure 8, the CFWT is typically made of 6 to 24 blades and cylindrical shapes in single or multi-stages. This number of blades depends on the rotor diameter ratio, efficiency, cut-in, and cut-off. This figure shows components of CFWTs, such as the rotor, deflector, stand, and case. The deflector, which conducts the airflow into the rotor blades to increase the turbine's efficiency, is an optional augmentation device [81]. In addition, it is made in different shapes, sizes, and angles. A case holds all components together and is fixed to the ground or foundation by a stand. A power regulation system is required to adjust the output power in changing wind speeds or to prevent damage to the turbine and generator when the wind speed exceeds the cut-off speed. The controller unit finds the critical conditions by various sensors; thereby, it activates the braking system [82]. The methods for the brake are mechanical, electromagnetic, or mechanical-electromagnetic braking [83].  Figure 9 depicts two ways to install a CFWT: standing (VAWT) and sitting (HAWT). Turbine installation methods are determined based on available space and the installation site specifications [49]. Buildings with vaulted and rounded roofs are the optimum roof shape for installation [84,85].  Turbine installation methods are determined based on available space and the installation site specifications [49]. Buildings with vaulted and rounded roofs are the optimum roof shape for installation [84,85].  Figure 9 depicts two ways to install a CFWT: standing (VAWT) and sitting (HAWT). Turbine installation methods are determined based on available space and the installation site specifications [49]. Buildings with vaulted and rounded roofs are the optimum roof shape for installation [84,85]. The main application of CFWTs is to generate electricity from the airflow. This flow is created by the movement of vehicles on busy highways. The clean energy can be generated by installing many turbines in median strips [86][87][88][89][90][91][92] and using generated electricity on highway lights, traffic lights, traffic control cameras, pedestrian lights, and power supplies for electric vehicle charging stations. Additionally, the turbine can be installed on the runway, which uses the airflow, which is created by the movement of the aircraft, to produce energy [93]. CFWTs can also be used as a wave energy converter in Oscillating Water Columns (OWC), which utilizes the air's kinetic energy caused by ocean waves [94][95][96].

Advantages and Disadvantages of CFWTs
The CFWT has a high CT at low wind speed. Therefore, it is an excellent candidate to use as a self-starting turbine. Low noise, remarkable stability, and a cut-in speed lower than 2 m/s make CFWTs suitable for urban areas. Moreover, its simple structure needs low maintenance costs and is not as dangerous for flying birds as HAWTs. Depending on the size and structure of the site, different methods can be used for installation. In addition, due to the low starting speed, it can be installed near the ground (0.5 m to 10 m above the ground) [48].
According to Figure 10, the CP,max of this turbine (0.12) is very low compared to the others. Nevertheless, by using augmentation devices, its CP can be increased. Since the CFWT is one of the SSWTs, it cannot generate energy at high wind speeds (approximately more than 20 m/s). CFWT material is cheaper, lighter in weight, and possesses higher strength than industrial turbine material [97]. Therefore, the blade rotation is expected to be stopped in the high-speed range to prevent damage to the turbine components [48,98]. The main application of CFWTs is to generate electricity from the airflow. This flow is created by the movement of vehicles on busy highways. The clean energy can be generated by installing many turbines in median strips [86][87][88][89][90][91][92] and using generated electricity on highway lights, traffic lights, traffic control cameras, pedestrian lights, and power supplies for electric vehicle charging stations. Additionally, the turbine can be installed on the runway, which uses the airflow, which is created by the movement of the aircraft, to produce energy [93]. CFWTs can also be used as a wave energy converter in Oscillating Water Columns (OWC), which utilizes the air's kinetic energy caused by ocean waves [94][95][96].

Advantages and Disadvantages of CFWTs
The CFWT has a high C T at low wind speed. Therefore, it is an excellent candidate to use as a self-starting turbine. Low noise, remarkable stability, and a cut-in speed lower than 2 m/s make CFWTs suitable for urban areas. Moreover, its simple structure needs low maintenance costs and is not as dangerous for flying birds as HAWTs. Depending on the size and structure of the site, different methods can be used for installation. In addition, due to the low starting speed, it can be installed near the ground (0.5 m to 10 m above the ground) [48].
According to Figure 10, the C P,max of this turbine (0.12) is very low compared to the others. Nevertheless, by using augmentation devices, its C P can be increased. Since the CFWT is one of the SSWTs, it cannot generate energy at high wind speeds (approximately more than 20 m/s). CFWT material is cheaper, lighter in weight, and possesses higher strength than industrial turbine material [97]. Therefore, the blade rotation is expected to be stopped in the high-speed range to prevent damage to the turbine components [48,98].

Parameters Affecting the Performance of CFWT
The aerodynamic performance prediction of the CFWT discussed in the previous section is crucial to its design optimization. For the performance analysis, different parame-

Parameters Affecting the Performance of CFWT
The aerodynamic performance prediction of the CFWT discussed in the previous section is crucial to its design optimization. For the performance analysis, different parameters, such as C T , C P , and aerodynamic loads, must be determined, and the rotor's flow field must be visualized. Over the last two decades, computational and experimental techniques for fluid flow analysis around the blades have significantly developed.
Kawamura et al. [99,100] showed a 2D numerical method to calculate the complex flow fields around the cylindrical 12-bladed CFWT and computed the C T and C P . They used the Incompressible Navier-Stokes equation with a rotating coordinate system, which rotates at the same speed as the CFWT, and is used to simplify the boundary conditions on the blades. The fractional step method is used to solve these equations, and a third-order upwind scheme is chosen to approximate the non-linear terms. Also, the C P has its maximum value, 0.11, around λ = 0.28, and C T is inversely related to λ. Kono et al. [101] performed a wind tunnel experiment (WTE) at λ = 0.4 to measure the flow characteristics around a CFWT and CFD simulation at λ = 0.1, 0.4, and 0.7. The CFD approach validated the WTE measurements and confirmed that with an increase in λ, the velocity deficit and the turbulence kinetic energy were generally increased on the leeward of the return side of the WT.
In contrast, they were generally decreased on the leeward of the drive side of the WT. In another WTE investigation at wind speeds from 4 to 10 m/s, Sivamani et al. [102] reported that the peak power coefficient, C P , max of 0.0485, was obtained for TSR = 0.50. Using a CFWT with the eight blades arrangement, Al-Maaitah [103] reported a maximum C P of 0.30 at λ between 0.35 to 0.60. The experimental and numerical studies for CFWTs involving alterations in the geometrical parameters, e.g., number of blades, rotor arrangement, blade orientation and shape, and the number of stages, are discussed. Similarly, the investigations regarding augmentation devices are also addressed in the subsequent section.

Number of Blades
Rotor blades number plays a key role in determining specific performance parameters at different wind speeds. Numerous studies have been made regarding the optimum rotor blade number. Their results indicate that this number can vary depending on various conditions, such as the direction of rotation, type of installation (VAWT or HAWT), blade shapes, wind velocity, and Reynolds number. In most studies, 12 [104][105][106] and 16 [107][108][109] blades were recommended that can lead to the highest performance. However, other studies determined that 7 [110], 18 [111], 20 [112,113], and 22 [114,115] blades were the best choices. Table 3 presents studies on the number of CFWT blades.

Configuration and Arrangement
Pertiwi et al. [116] focused on a WTE using linear configuration to know the effect on the turbine performance. The distance between two turbines to be 1.5D, 2D, and 2.5D (D represents the outer diameter of CFWT). The aspect ratio of each turbine is 1 (200 mm in diameter and 200 mm in height). They informed that when two CFWTs are arranged linear and parallel to the wind flow, the downstream turbine is shielded from the inlet flow by the upstream turbine. Therefore, the downstream turbine interferes with the turbulence and vortex formation region and wake dynamics of the upstream turbine. Also, their results show that the C P increased with increasing the distance between two turbines. In other words, it reached the highest C P at the 2.5D distance, 0.122 in the upstream turbine and 0.082 in the downstream turbine.
In a similar investigation, Arifin et al. [104] positioned two CFWTs in a linear configuration and adjusted them to rotate in opposite directions. They used a wind tunnel with a diffuser and a fan to control the flow velocity. Wind speed was measured at three spots: a, b, and c. Their study concluded that the CFWT linear with opposite rotation could improve the performance of WTs. Moreover, Sato et al. [117] developed a numerical method to calculate the flow fields around multiple CFWTs in a linear arrangement. They computed the effect of numerous lined CFWTs and their dependency on the incoming wind direction at various boundary conditions to investigate how they interact.
In most cases, WTs are not installed linearly. Rather, they are installed in a farm arrangement. To better operation, a proper arrangement of WTs on the wind farm should be determined to decrease wake. For this purpose, Oktavitasari et al. [118] studied the wind farm in an aligned and staggered configuration with 2-dimensional numerical analysis using ANSYS Fluent CFD software. Figure 11 shows their configuration, in which the distance between the turbines was 0.5D, 1D, and 1.5D (D represents the outer diameter of the CFWT). Their study revealed that the best arrangement is a staggered configuration within the distance S1:S2 of 0.5D:0.5D. In this arrangement, the power density of the wind farm achieved the highest level of 1.641 W/m 2 .
uration and adjusted them to rotate in opposite directions. They used a wind tunnel a diffuser and a fan to control the flow velocity. Wind speed was measured at three s a, b, and c. Their study concluded that the CFWT linear with opposite rotation coul prove the performance of WTs. Moreover, Sato et al. [117] developed a numerical me to calculate the flow fields around multiple CFWTs in a linear arrangement. They puted the effect of numerous lined CFWTs and their dependency on the incoming direction at various boundary conditions to investigate how they interact.
In most cases, WTs are not installed linearly. Rather, they are installed in a far rangement. To better operation, a proper arrangement of WTs on the wind farm sh be determined to decrease wake. For this purpose, Oktavitasari et al. [118] studie wind farm in an aligned and staggered configuration with 2-dimensional numerical ysis using ANSYS Fluent CFD software. Figure 11 shows their configuration, in whic distance between the turbines was 0.5D, 1D, and 1.5D (D represents the outer diame the CFWT). Their study revealed that the best arrangement is a staggered configur within the distance S1:S2 of 0.5D:0.5D. In this arrangement, the power density of the farm achieved the highest level of 1.641 W/m 2 . Other research studied the feasibility of using CFWTs as single rotors in VAW as blades in HAWTs. Pujol et al. [115] numerically investigated the flow field charac tics, the drag-to-lift ratio, CT, and CP using the 2D-CFD method (ANSYS Fluent). Fur more, they validated all cases with experimental data obtained in a WTE under run conditions. Their simulation showed that the CFWT in the HAWT needed an ext (non-wind) power supply to rotate the CFWT at a constant rotational speed. The drag and torque coefficients in the whole rotors for a 2-D simulation show an oscillating be ior with a dominant frequency. The source of this dominant frequency is in the nonnating vortex shedding, which is detected downstream of the rotor. Because of its a tude, it must be considered to prevent resonances when designing the turbine struc This effect is not clearly observed in VAWT mode. The CP,max in the VAWT is 0.19, w occurred at very low values of TSR (≈0.3). However, the available net power of the H Figure 11. The configuration WT aligned and staggered of wind farm.
Other research studied the feasibility of using CFWTs as single rotors in VAWTs or as blades in HAWTs. Pujol et al. [115] numerically investigated the flow field characteristics, the drag-to-lift ratio, C T , and C P using the 2D-CFD method (ANSYS Fluent). Furthermore, they validated all cases with experimental data obtained in a WTE under runaway conditions. Their simulation showed that the CFWT in the HAWT needed an external (non-wind) power supply to rotate the CFWT at a constant rotational speed. The drag, lift, and torque coefficients in the whole rotors for a 2-D simulation show an oscillating behavior with a dominant frequency. The source of this dominant frequency is in the non-alternating vortex shedding, which is detected downstream of the rotor. Because of its amplitude, it must be considered to prevent resonances when designing the turbine structure. This effect is not clearly observed in VAWT mode. The C P,max in the VAWT is 0.19, which occurred at very low values of TSR (≈0.3). However, the available net power of the HAWT (extracted power minus required to rotate the rotors) is much lower, with a maximum net power coefficient C P,net = 0.14 for TSR = 0.9 and α = 0.7 (the cylinder spin ratio). Thus, it is necessary for HAWT applications to design the CFR with aerodynamic blades so that the lift-to-drag ratio is low and, simultaneously, has low resistant torques.

Number of Stages
The CFWT undergoes large fluctuations in torque at different azimuthal angles during its rotation. Such fluctuations in the turbine structure can significantly affect its useful life cycle and thus call its feasibility into question. Stacking single turbines on top of each other with distinct phase differences between the blades (phase shift angle) has been a well-known technique in WT optimization. Such an arrangement has led to an outstanding reduction in torque fluctuations. Several studies have reported better performance for multi-stage turbines than conventional single-stage designs. Due to the effectiveness of multi-stage turbines, Fahrudin et al. [119] conducted an experimental study to investigate the effect of multi-stage CFWTs on wind energy extraction. They have tested three types of rotors (single-stage, double-stage, and triple-stage) with different phase shift angles of 0 • , 6 • , and 12 • in the wind tunnel at wind speeds of 3 to 4.85 m/s. Based on their results, C P,max = 0.13 was obtained for double-stage and C P,max = 0.12 for 12 • phase shift angle at wind speed 4.05 m/s. They also mentioned that multi-stage and phase shift provide good value, reducing the negative torque.

Blade Orientation and Shape
The turbine angular rotation and the generated torque mainly dependent on drag force determine the CFWT power. Similarly, the drag force applying to the turbine relies on the blade profile and its alignment, which makes the blade shape an important aspect of the design. The conventional blades were semi-circular with an arc of 180 • , and researchers provided blade modifications to increase the turbine performance over time. These modifications included rotor diameter [120,121], rotor diameter ratio [112,113], angle of blade [111,122,123], thickness [114], and blade circumferential length [110]. However, the aspect ratio is an important parameter; research has yet to be done on CFWTs.
Rotor diameter ratio means the ratio of the outer diameter to the inner diameter of the rotor blade. Experimental and CFD studies show that by choosing diameter ratios of 0.58, 0.63, 0.68, and 0.73, and furthermore, by keeping the outer diameter constant, the highest C P of 0.049 [112] and 0.5 [113] were reported for a diameter ratio of 0.68. The discrepancy comes from working with different blade shapes, aspect ratios, Reynolds numbers, various simulation assumptions, and laboratory errors. In addition, the angle of blade (θ) (Figure 12a), which is the angle between the tangent line to the rotor circumference and the endpoint of the blade, is investigated. In a study [122] with angles of 30 • , 45 • , 60 • , and 90 • , the best result was obtained at 45 • , with C P = 0.41 at TSR = 0.76. Similarly, in another study [111] with angles of 45 • , 60 • , and 75 • , the highest performance occurred at 45 • , with C P,max = 0.45 at TSR = 0.3. According to Figure 12b, Option-A, with an average torque of 3.2 Nm, performs higher than Option-B [123]. A 2D transient simulation [87] was performed with ANSYS Fluent on four thicknesses of blades of 2.6, 10, 15, and 20 mm to investigate the effect of blade thickness. The highest C P was 0.5 at TSR = 0.2, obtained by a maximum blade thickness of 20 mm. The circumferential blade length study [110] showed that for six-and seven-blade turbines with 30 • circumferential cuts at the front and back of the blade, the C P increased from 0.043 for the conventional blades to 0.24 for a seven-blade turbine with double cut blades. A summary of the optimization studies discussed above is provided in Table 3.

Augmentation Devices for CFWT
The wind is variable by nature-the direction of the wind and its speed change at every moment. Despite obstacles (tall buildings and trees), these changes will be intensified in urban areas and cause turbulent and multi-directional fluid flows. Finally, turbulent flow entry into the turbine reduces its efficiency. Thus, many researchers have tried to improve its performance by designing and optimizing the devices that steer the wind flow into the turbine. The following are ways to increase the efficiency of the turbine. A summary of the augmentation devices and their advantages/disadvantages, which will be discussed in detail, is provided in Table 4.

Guide Nozzle
The converging nozzle at the inlet section of a turbine increases wind speed when it hits the blades, thereby enhancing the efficiency. Since wind angle constantly changes at WTs, this method is widely used in hydroelectric turbines. Shikha et al. [124] used a converging nozzle (Figure 13a) to concentrate wind flow and increase turbine power, which is suitable for low wind speed areas. In the wind tunnel study, they tested three parameters: the number of blades, nozzle length, and the ratio of the inlet to outlet cross-section. The best result was in the six blades, a nozzle length of 55 cm, and an input/output ratio of 0.15, which increased wind speed by 3.7 times. Figure 14 shows another study by Son et al. [125] that used two curved and straight nozzles. The CFD simulations demonstrated that the curved nozzle is more efficient than the straight nozzle and has doubled the power coefficient (C P,max = 0.265). In addition, Krishan et al. [126] performed a 3D-CFD simulation of a CFWT with a diffuser-shaped shroud section, as shown in Figure 13b, at the top of the building. They concluded that the C P could be improved from 0.135 to 0.34 by relocation and changing the nozzle input angle. Kang et al. [94] optimized CFWTs for an Oscillating Water Column Wave Energy Converter. According to Figure 15, the optimized model had 36 blades with 3 mm thickness and 0.38 nozzle throat width ratio. According to the authors, the maximum efficiency of the optimized model was 0.611, which was 1.7% higher than the reference model. et al. [125] that used two curved and straight nozzles. The CFD simulations demonstrated that the curved nozzle is more efficient than the straight nozzle and has doubled the power coefficient (CP,max = 0.265). In addition, Krishan et al. [126] performed a 3D-CFD simulation of a CFWT with a diffuser-shaped shroud section, as shown in Figure 13b, at the top of the building. They concluded that the CP could be improved from 0.135 to 0.34 by relocation and changing the nozzle input angle. Kang et al. [94] optimized CFWTs for an Oscillating Water Column Wave Energy Converter. According to Figure 15, the optimized model had 36 blades with 3 mm thickness and 0.38 nozzle throat width ratio. According to the authors, the maximum efficiency of the optimized model was 0.611, which was 1.7% higher than the reference model.

Casing
A casing usually acts like a nozzle at the inlet by directing flow to the blades and a diffuser at the outlet by preventing a sudden drop in pressure behind the blades. Shigemitsu et al. [127] analyzed the two types of casing and the position of the side board (in the beginning or end of the casing). According to Figure 16a, in CFD and experimental analysis, the CP,max was obtained as 0.19 for casing 2, side board at the end, and a 30° inclination angle. In other studies [128,129] focusing mainly on the position of the side board (Figure 16b), they concluded that the CP,max was 0.17 with position 5 (P5), 72% more than the rotor without casing and side board. Likewise, by changing the casing height ( Figure  16c), the CP,max is 0.19 with casing C2, which is 94% higher than the one without casing [130]. Also, the other two types of casing were tested; the result shows that an increase of 1.5 times of the CP has been achieved (CP,max = 0.22) in the presence of casing 2, compared to the state that it is absent [131].

Casing
A casing usually acts like a nozzle at the inlet by directing flow to the blades and a diffuser at the outlet by preventing a sudden drop in pressure behind the blades. Shigemitsu et al. [127] analyzed the two types of casing and the position of the side board (in the beginning or end of the casing). According to Figure 16a, in CFD and experimental analysis, the CP,max was obtained as 0.19 for casing 2, side board at the end, and a 30° inclination angle. In other studies [128,129] focusing mainly on the position of the side board (Figure 16b), they concluded that the CP,max was 0.17 with position 5 (P5), 72% more than the rotor without casing and side board. Likewise, by changing the casing height ( Figure  16c), the CP,max is 0.19 with casing C2, which is 94% higher than the one without casing [130]. Also, the other two types of casing were tested; the result shows that an increase of 1.5 times of the CP has been achieved (CP,max = 0.22) in the presence of casing 2, compared to the state that it is absent [131].

Casing
A casing usually acts like a nozzle at the inlet by directing flow to the blades and a diffuser at the outlet by preventing a sudden drop in pressure behind the blades. Shigemitsu et al. [127] analyzed the two types of casing and the position of the side board (in the beginning or end of the casing). According to Figure 16a, in CFD and experimental analysis, the C P,max was obtained as 0.19 for casing 2, side board at the end, and a 30 • inclination angle. In other studies [128,129] focusing mainly on the position of the side board (Figure 16b), they concluded that the C P,max was 0.17 with position 5 (P5), 72% more than the rotor without casing and side board. Likewise, by changing the casing height (Figure 16c), the C P,max is 0.19 with casing C2, which is 94% higher than the one without casing [130]. Also, the other two types of casing were tested; the result shows that an increase of 1.5 times of the C P has been achieved (C P,max = 0.22) in the presence of casing 2, compared to the state that it is absent [131]. nation angle. In other studies [128,129] focusing mainly on the position of the side board (Figure 16b), they concluded that the CP,max was 0.17 with position 5 (P5), 72% more than the rotor without casing and side board. Likewise, by changing the casing height ( Figure  16c), the CP,max is 0.19 with casing C2, which is 94% higher than the one without casing [130]. Also, the other two types of casing were tested; the result shows that an increase of 1.5 times of the CP has been achieved (CP,max = 0.22) in the presence of casing 2, compared to the state that it is absent [131].

Windshield
Another type of fluid flow guidance method is to use a windshield. Figure 17a shows a windshield wrapped around the turbine at a 90 • angle. In this case, the C P reaches 0.278, which increases 67% compared to the turbine without the windshield [132,133]. A CFWT simulated with a windshield at different angles along the highways shows that when a car is passing, the 60 • windshield increases the captured energy by the VAWT up to 16.14% [91]. The location of a windshield is as important as its angle. This location on the upstream side (e.g., A in Figure 17b) slows the flow behind itself, which prevents the drag from acting against the rotation of the turbine. If the downstream windshield is present (e.g., B in Figure 17b), more fluid will capture into the turbine. This flow helps to rotate the turbine [99]. Also, the windshield setting angle was investigated between the values of Ψ = 9 • and 18 • , as shown in Figure 17c. The C P,max obtained for Ψ = 9 • and TSR = 0.4~0.5 is about twice as large as that for the case without the windshield [134].

Windshield
Another type of fluid flow guidance method is to use a windshield. Figure 17a shows a windshield wrapped around the turbine at a 90° angle. In this case, the CP reaches 0.278, which increases 67% compared to the turbine without the windshield [132,133]. A CFWT simulated with a windshield at different angles along the highways shows that when a car is passing, the 60° windshield increases the captured energy by the VAWT up to 16.14% [91]. The location of a windshield is as important as its angle. This location on the upstream side (e.g., A in Figure 17b) slows the flow behind itself, which prevents the drag from acting against the rotation of the turbine. If the downstream windshield is present (e.g., B in Figure 17b), more fluid will capture into the turbine. This flow helps to rotate the turbine [99]. Also, the windshield setting angle was investigated between the values of Ψ = 9° and 18°, as shown in Figure 17c. The CP,max obtained for Ψ = 9° and TSR = 0.4~0.5 is about twice as large as that for the case without the windshield [134].
Results of experimental research [135] demonstrate that the wind concentrator (Figure 18) greatly enhances the CP,max of the CFWT from 0.12 (without the windshield and the wind concentrator) to 0.25 (with the windshield and the wind concentrator) by 108%. However, the arc-shaped windshield improves it by only 48% from 0.12 to 0.17 (with the windshield).  Results of experimental research [135] demonstrate that the wind concentrator ( Figure 18) greatly enhances the C P,max of the CFWT from 0.12 (without the windshield and the wind concentrator) to 0.25 (with the windshield and the wind concentrator) by 108%. However, the arc-shaped windshield improves it by only 48% from 0.12 to 0.17 (with the windshield).

Guide Vane
CFWT performance can also be improved by using a vane at the beginning of the turbine to steer the wind and prevent it from hitting the convex part of the rotor blades.

Guide Vane
CFWT performance can also be improved by using a vane at the beginning of the turbine to steer the wind and prevent it from hitting the convex part of the rotor blades. As illustrated in Figure 19a, Tanino et al. [136] enhanced 30% of the CFWT performance by using a deflector and an Inlet Guide Vane (GV). The deflector was set near a CFWT, and an inlet GV was placed on the structure's edge, improving the wind flow inside the WT. Subsequently, the C P,max was 15% to 40% higher, and the TSR range showing the high C P was wide. Furthermore, Santoso and Tjahjana [137] positioned a CFWT at the discharge outlet of a cooling tower model. They demonstrate when the GV was 150 mm from the center, and at the angle of 30 • , the turbine had the highest C P of 0.49. In short, the C P increased by 84.3% compared to the CFWT without GV. As illustrated in Figure 19a, Tanino et al. [136] enhanced 30% of the CFWT performance by using a deflector and an Inlet Guide Vane (GV). The deflector was set near a CFWT, and an inlet GV was placed on the structure's edge, improving the wind flow inside the WT. Subsequently, the CP,max was 15% to 40% higher, and the TSR range showing the high CP was wide. Furthermore, Santoso and Tjahjana [137] positioned a CFWT at the discharge outlet of a cooling tower model. They demonstrate when the GV was 150 mm from the center, and at the angle of 30°, the turbine had the highest CP of 0.49. In short, the CP increased by 84.3% compared to the CFWT without GV.

Deflector
The deflectors act in similar GVs, and except the angle, can be adjusted manually after installing the turbine. In addition to investigating the effect of the GV on turbine performance, Tanino et al. [136] also tested the deflector effect. They recommended that the GV and deflector could significantly increase power production in future designs. Tian et al. [138] conducted a 2D transient CFD simulation to quantify the effects of a novel pitch-adjustable deflector they called passive-pitch shield (PPS). As shown in Figure 20, their PPS could passively adjust its pitch angle and improve the efficiency of the CFWT in all wind directions. The CP,max of the CFWT is increased by 46.32% with type A. Changing the deflection angle of the upstream plate can effectively increase the torque and power of the CFWT. Conversely, the arc-type upstream plate (Figure 20d) is unsuitable for improving turbine performance. A CFD model was implemented in another study [139] to train and validate the genetic algorithm combined with an artificial neural network. According to Figure 21, this method was applied to design the deflectors of an actual 8-blade, 1 kW, and 2.5 m height CFWT. Optimized deflectors increased turbine efficiency by 30%, from 0.215 to 0.279. Compared to classical simulation-based optimization, this method reduces up to 97% of the computational cost.

Deflector
The deflectors act in similar GVs, and except the angle, can be adjusted manually after installing the turbine. In addition to investigating the effect of the GV on turbine performance, Tanino et al. [136] also tested the deflector effect. They recommended that the GV and deflector could significantly increase power production in future designs. Tian et al. [138] conducted a 2D transient CFD simulation to quantify the effects of a novel pitch-adjustable deflector they called passive-pitch shield (PPS). As shown in Figure 20, their PPS could passively adjust its pitch angle and improve the efficiency of the CFWT in all wind directions. The C P,max of the CFWT is increased by 46.32% with type A. Changing the deflection angle of the upstream plate can effectively increase the torque and power of the CFWT. Conversely, the arc-type upstream plate (Figure 20d) is unsuitable for improving turbine performance. A CFD model was implemented in another study [139] to train and validate the genetic algorithm combined with an artificial neural network. According to Figure 21, this method was applied to design the deflectors of an actual 8-blade, 1 kW, and 2.5 m height CFWT. Optimized deflectors increased turbine efficiency by 30%, from 0.215 to 0.279. Compared to classical simulation-based optimization, this method reduces up to 97% of the computational cost.
their PPS could passively adjust its pitch angle and improve the efficiency of the CFWT i all wind directions. The CP,max of the CFWT is increased by 46.32% with type A. Changin the deflection angle of the upstream plate can effectively increase the torque and powe of the CFWT. Conversely, the arc-type upstream plate (Figure 20d) is unsuitable for im proving turbine performance. A CFD model was implemented in another study [139] t train and validate the genetic algorithm combined with an artificial neural network. Ac cording to Figure 21, this method was applied to design the deflectors of an actual 8-blade 1 kW, and 2.5 m height CFWT. Optimized deflectors increased turbine efficiency by 30% from 0.215 to 0.279. Compared to classical simulation-based optimization, this metho reduces up to 97% of the computational cost.

Cowling
This type of design is suitable for turbulent wind flow with sudden direction changes. According to Figure 22, the cowling around the turbine allows one-way wind to enter, i.e., half of the cylindrical shell in the inlet area is closed to prevent the wind flow from hitting the blade's convex part. When the cowling input is not in the wind direction, the canopy of the cowling plays the role of a rotating mechanism (rotator). The cowling comprises a rotary duct and a discharge tube (hood/shroud). The rotary duct is perpendicular to the center of the turbine and causes the incoming wind flow to circulate inside the turbine and exit through the hood. Moreover, the hood causes a pressure difference between the outlet and the center of the turbine, and this low-pressure rotational flow can increase the turbine propulsion. As a result, the turbine blades rotate faster [140,141].
Another prototype [142] was tested on two types of turbines with 8 and 16 blades. Respectively, 26% and 40% increases in rotor angular velocity were observed. A 3D study [143] (Figure 23) investigated mass swallowing capacities and corresponding efficiencies to the proposed casings and blade profiles at low Reynolds numbers. Another design investigation [144] was pursued by machine learning algorithms coupled with CFD, and at first, sensitivity analysis revealed the most important parameters and then determined their optimal value. Finally, with CP,max of 0.29 at Rec = 1.7 × 10 5 , a 103% improvement over the original design was obtained.

Cowling
This type of design is suitable for turbulent wind flow with sudden direction changes. According to Figure 22, the cowling around the turbine allows one-way wind to enter, i.e., half of the cylindrical shell in the inlet area is closed to prevent the wind flow from hitting the blade's convex part. When the cowling input is not in the wind direction, the canopy of the cowling plays the role of a rotating mechanism (rotator). The cowling comprises a rotary duct and a discharge tube (hood/shroud). The rotary duct is perpendicular to the center of the turbine and causes the incoming wind flow to circulate inside the turbine and exit through the hood. Moreover, the hood causes a pressure difference between the outlet and the center of the turbine, and this low-pressure rotational flow can increase the turbine propulsion. As a result, the turbine blades rotate faster [140,141].

Cowling
This type of design is suitable for turbulent wind flow with sudden direction changes. According to Figure 22, the cowling around the turbine allows one-way wind to enter, i.e., half of the cylindrical shell in the inlet area is closed to prevent the wind flow from hitting the blade's convex part. When the cowling input is not in the wind direction, the canopy of the cowling plays the role of a rotating mechanism (rotator). The cowling comprises a rotary duct and a discharge tube (hood/shroud). The rotary duct is perpendicular to the center of the turbine and causes the incoming wind flow to circulate inside the turbine and exit through the hood. Moreover, the hood causes a pressure difference between the outlet and the center of the turbine, and this low-pressure rotational flow can increase the turbine propulsion. As a result, the turbine blades rotate faster [140,141].
Another prototype [142] was tested on two types of turbines with 8 and 16 blades. Respectively, 26% and 40% increases in rotor angular velocity were observed. A 3D study [143] (Figure 23) investigated mass swallowing capacities and corresponding efficiencies to the proposed casings and blade profiles at low Reynolds numbers. Another design investigation [144] was pursued by machine learning algorithms coupled with CFD, and at first, sensitivity analysis revealed the most important parameters and then determined their optimal value. Finally, with CP,max of 0.29 at Rec = 1.7 × 10 5 , a 103% improvement over the original design was obtained.  Another prototype [142] was tested on two types of turbines with 8 and 16 blades. Respectively, 26% and 40% increases in rotor angular velocity were observed. A 3D study [143] ( Figure 23) investigated mass swallowing capacities and corresponding efficiencies to the proposed casings and blade profiles at low Reynolds numbers. Another design investigation [144] was pursued by machine learning algorithms coupled with CFD, and at first, sensitivity analysis revealed the most important parameters and then determined their optimal value. Finally, with C P,max of 0.29 at Re c = 1.7 × 10 5 , a 103% improvement over the original design was obtained.

ODGV
One of the main limitations of the above devices is that they are only used for o direction wind flow, not for multi-direction, whereas in nature, the wind blows in direction. The rotating mechanism does not appear to be very efficient. One solutio ODGV, consisting of an upper and a lower wall with several blades or GVs. The bla are fixed and designed based on the blade angle of attack to improve the turbine s starting and reduce the negative torque and rotational speed fluctuations. Overall, no quirement for a rotating mechanism, low cut-in speed, and increasing angular velocity the advantages of this design. Low cut-in speed is an advantage, although it is worth vestigating if this can be of practical advantage in reality. That is mainly due to the cu dependence of the output power of the turbine on the wind speed, as well as the efficiency of mechanical and electrical systems at partial load operations. Indeed, the pression is that even if some electrical energy is generated at 2 m/s wind speed, it sho be extremely small.
In an experimental study, Wicaksono et al. [145] evaluated the effect of ODGV concluded that the CP increased by 21.46%. Chong et al. [146,147] performed numer and experimental analysis for ODGV with four pairs of blades at 20° and 55° angles ( ure 24a). Their results showed a 182% increase in the blade angular velocity. Accord to Figure 24b, Wong et al. [148] illustrated that if these four pairs of blades bent with angle of 10° in the middle, it reduced the cut-in speed. It improved the turbine startand the CP increased by 31.6% compared to the ODGV without a bend and 147.1% rela to the turbine without ODGV.
Subsequently, Korprasertsak et al. [149] achieved a 48% and 51.4% increase in compared to turbines without ODGV, respectively, using curved and direct blade ODGV (Figure 24c). The number and tilt angle of blades also affects the CP and TSR. A ditionally, an experiment [150] including 4, 5, and 6 blades was performed at a tilt an of 0°, 20°, 40°, and 60°. The optimal state was 6 blades at a tilt angle of 60°. Another exp

ODGV
One of the main limitations of the above devices is that they are only used for onedirection wind flow, not for multi-direction, whereas in nature, the wind blows in any direction. The rotating mechanism does not appear to be very efficient. One solution is ODGV, consisting of an upper and a lower wall with several blades or GVs. The blades are fixed and designed based on the blade angle of attack to improve the turbine selfstarting and reduce the negative torque and rotational speed fluctuations. Overall, no requirement for a rotating mechanism, low cut-in speed, and increasing angular velocity are the advantages of this design. Low cut-in speed is an advantage, although it is worth investigating if this can be of practical advantage in reality. That is mainly due to the cubic dependence of the output power of the turbine on the wind speed, as well as the low efficiency of mechanical and electrical systems at partial load operations. Indeed, the impression is that even if some electrical energy is generated at 2 m/s wind speed, it should be extremely small.
In an experimental study, Wicaksono et al. [145] evaluated the effect of ODGV and concluded that the C P increased by 21.46%. Chong et al. [146,147] performed numerical and experimental analysis for ODGV with four pairs of blades at 20 • and 55 • angles (Figure 24a). Their results showed a 182% increase in the blade angular velocity. According to Figure 24b, Wong et al. [148] illustrated that if these four pairs of blades bent with an angle of 10 • in the middle, it reduced the cut-in speed. It improved the turbine start-up, and the C P increased by 31.6% compared to the ODGV without a bend and 147.1% relative to the turbine without ODGV.
Sustainability 2023, 15, x FOR PEER REVIEW 25 of conical surfaces promote turbulent mixing above and below, the stator back pressure reduced, and the WT power output is increased. The simulation results showed that th average CP and CT increased by about 30% to 35% compared to turbines without ODGV

Zephyr
A zephyr consists of 9 blades placed around the CFWT, as illustrated in Figure 2 Due to the special shape of its blades, the zephyr reduces the flow turbulence and chang the direction of wind flow to a certain angle so that the CFWT can absorb more energy. CFD simulation using k-ɛ turbulence model and WTE shows that the zephyr can increa the CP from 0.098 to 0.12 [154,155].

The Importance of a Suitable Site Location
Site location is the essential and primary factor for understanding the wind behavio selecting WTs' type and scale, designing the wind farms (WF), and measuring their effe tiveness [156]. Figure 26 shows some of the best urban and non-urban WF locations. B fore starting the construction of a WF, it is necessary to perform the WRA [157,158] estimate the potential locations and identify wind characteristics accurately. The wide used methods of WRA include measurement [159], measure-correlate-predict [160], win atlas methodology [161], Mesoscale modelling [162], and combined Mesoscale-Microsca modelling [163]. Also, in WRA, the uncertainty in the data that affects the WT output an capital expense (CAPEX) must be considered [158,164,165]. The choice of turbine typ Subsequently, Korprasertsak et al. [149] achieved a 48% and 51.4% increase in C P compared to turbines without ODGV, respectively, using curved and direct blades in ODGV (Figure 24c). The number and tilt angle of blades also affects the C P and TSR. Additionally, an experiment [150] including 4, 5, and 6 blades was performed at a tilt angle of 0 • , 20 • , 40 • , and 60 • . The optimal state was 6 blades at a tilt angle of 60 • . Another experiment [109] focused on the CFWT rotor as well. The optimal state of 16 CFWT blades with 16 ODGV blades was obtained at a tilt angle of 60 • , with a 49% increase in C P compared to turbines without ODGV. Similarly, Shimizu et al. [77] tested ODGV with 3, 4, 6, and 8 blades at tilt angles of 0 • , 30 • , and 60 • with blade lengths of R and 2R (R is rotor radius). They acknowledged that with 3 blades at 2R lengths at 30 • , a 120% increase in C P,max was achieved compared to a case without ODGV. Akabane [151] and Motohashi [152] experimentally installed 2-6 ODGV blades and demonstrated that a C P of 0.15-0.25 could be achieved with this configuration. In summary, peak power output increases due to the increase in ODGV blade number [106].
Another similar design was proposed by Noble et al. [153], who used the eight NACA0018 airfoil types as blades and two conical surfaces. As the outer edges of the conical surfaces promote turbulent mixing above and below, the stator back pressure is reduced, and the WT power output is increased. The simulation results showed that the average C P and C T increased by about 30% to 35% compared to turbines without ODGV.

Zephyr
A zephyr consists of 9 blades placed around the CFWT, as illustrated in Figure 25. Due to the special shape of its blades, the zephyr reduces the flow turbulence and changes the direction of wind flow to a certain angle so that the CFWT can absorb more energy. A CFD simulation using k- conical surfaces promote turbulent mixing above and below, the stator back pressure is reduced, and the WT power output is increased. The simulation results showed that the average CP and CT increased by about 30% to 35% compared to turbines without ODGV.

Zephyr
A zephyr consists of 9 blades placed around the CFWT, as illustrated in Figure 25. Due to the special shape of its blades, the zephyr reduces the flow turbulence and changes the direction of wind flow to a certain angle so that the CFWT can absorb more energy. A CFD simulation using k-ɛ turbulence model and WTE shows that the zephyr can increase the CP from 0.098 to 0.12 [154,155].
turbulence model and WTE shows that the zephyr can increase the C P from 0.098 to 0.12 [154,155].

Zephyr
A zephyr consists of 9 blades placed around the CFWT, as illustrated in Figure 25. Due to the special shape of its blades, the zephyr reduces the flow turbulence and changes the direction of wind flow to a certain angle so that the CFWT can absorb more energy. A CFD simulation using k-ɛ turbulence model and WTE shows that the zephyr can increase the CP from 0.098 to 0.12 [154,155].

The Importance of a Suitable Site Location
Site location is the essential and primary factor for understanding the wind behavior, selecting WTs' type and scale, designing the wind farms (WF), and measuring their effectiveness [156]. Figure 26 shows some of the best urban and non-urban WF locations. Before starting the construction of a WF, it is necessary to perform the WRA [157,158] to estimate the potential locations and identify wind characteristics accurately. The widely used methods of WRA include measurement [159], measure-correlate-predict [160], wind atlas methodology [161], Mesoscale modelling [162], and combined Mesoscale-Microscale modelling [163]. Also, in WRA, the uncertainty in the data that affects the WT output and capital expense (CAPEX) must be considered [158,164,165]. The choice of turbine type

The Importance of a Suitable Site Location
Site location is the essential and primary factor for understanding the wind behavior, selecting WTs' type and scale, designing the wind farms (WF), and measuring their effectiveness [156]. Figure 26 shows some of the best urban and non-urban WF locations. Before starting the construction of a WF, it is necessary to perform the WRA [157,158] to estimate the potential locations and identify wind characteristics accurately. The widely used methods of WRA include measurement [159], measure-correlate-predict [160], wind atlas methodology [161], Mesoscale modelling [162], and combined Mesoscale-Microscale modelling [163]. Also, in WRA, the uncertainty in the data that affects the WT output and capital expense (CAPEX) must be considered [158,164,165]. The choice of turbine type largely depends on the site location, so for non-urban WF, large-scale HAWTs are commonly preferred [34]. However, SSWTs are the best options in urban areas due to vibration, noise, safety, visual impacts, high cut-in speed, and unpredictable efficiency change in an urban environment [166]. largely depends on the site location, so for non-urban WF, large-scale HAWTs are commonly preferred [34]. However, SSWTs are the best options in urban areas due to vibration, noise, safety, visual impacts, high cut-in speed, and unpredictable efficiency change in an urban environment [166]. Main wind characteristics (e.g., speed, direction, and profile of the wind, scales and intensity of turbulence as well as surface drag) in urban areas are greatly affected by urban morphology, surface roughness, weather temperature, latitude, longitude, and elevation of the site location [167].

Environmental, Social, and Economic Aspects
Wind energy has evolved exponentially in the last few years, and its environmental, social, and economic aspects have become more apparent. Noise, vibration, light reflection, visual impacts, effects on birds, and shadows are the most critical environmental issues [168]. Nevertheless, the economic aspects are more complex than the environmental, because economic issues are multidimensional and vary between countries and regions. For example, the Levelized Cost of Energy (LCoE) depends heavily on local conditions due to various factors (construction costs, permits, tariffs) and wind generation [169].
On the other hand, social acceptability is a major challenge for WT development, as it encompasses a wide range of stakeholders [170]. In addition, a variety of elements can affect it, such as costs, properties and results of the project, public interest and welfare, property costs, and environmental impacts in residential areas [171]. These aspects must be considered in new wind power projects to reduce project risk. Main wind characteristics (e.g., speed, direction, and profile of the wind, scales and intensity of turbulence as well as surface drag) in urban areas are greatly affected by urban morphology, surface roughness, weather temperature, latitude, longitude, and elevation of the site location [167].

Environmental, Social, and Economic Aspects
Wind energy has evolved exponentially in the last few years, and its environmental, social, and economic aspects have become more apparent. Noise, vibration, light reflection, visual impacts, effects on birds, and shadows are the most critical environmental issues [168]. Nevertheless, the economic aspects are more complex than the environmental, because economic issues are multidimensional and vary between countries and regions.
For example, the Levelized Cost of Energy (LCoE) depends heavily on local conditions due to various factors (construction costs, permits, tariffs) and wind generation [169].
On the other hand, social acceptability is a major challenge for WT development, as it encompasses a wide range of stakeholders [170]. In addition, a variety of elements can affect it, such as costs, properties and results of the project, public interest and welfare, property costs, and environmental impacts in residential areas [171]. These aspects must be considered in new wind power projects to reduce project risk.

Applications in Urban Buildings
If the urban area has low-density buildings, highly open space, and is away from the grid or unstable power, stand-alone WTs-a medium-scale HAWT-are used to generate electricity [172]. One of the techniques considered in high-density urban areas is to use a small-scale VAWT, which is designed for retrofitting existing buildings [146,173]. The building height, shape, roof shape, and distance between the buildings significantly affect the wind flow; thus, it can remarkably affect the turbine type and power output. Several studies have been performed to determine the different parameters, their effectiveness, the adequate kind of turbine, and its efficiency in three scales, i.e., isolated building [110,126], [174][175][176][177][178][179][180][181], building influenced by surrounding buildings, [182][183][184][185][186][187][188][189] and real city [190][191][192][193][194][195]; see Table 5. Moreover, the CFWT, which is a small-scale turbine, can be used in buildings instead of VAWTs. Artificial Intelligence (AI) approaches can be used for the identification and assessment of wind power, WT locations, and their performance in urban environments by using the validated CFD literature in various urban configurations [196][197][198][199]. Recently, these approaches have become popular due to their high precision, strong adaptability, and improved learning capability.
In addition, WTs can be fully integrated into the building's architectural design; for example, between building blocks and inside or on the corners of the building. Figure 27 depicts three main types of urban wind energy harvesting systems.

Challenges and Future Scopes
An overview of numerical and experimental investigations has indicated that the performance of CFWTs depends on various parameters, and the results are improving and promising. Further, there are many untouched gaps for researchers to address in the future: 1. Although the effect of geometrical parameters on turbine efficiency has been investigated, there is a lack of studies on aspect ratio and twisting angle of blades. 2. As discussed earlier, adding an augmentation device is essential for increasing the CP. However, they increase the total weight and design complexity. The appropriate type of augmentation choice depends on the analysis of the wind rose, project costs, installation method (HAWT or VAWT), and acceptable vibration, as well as noise.
Studies have yet to fill this gap. 3. There is a scope to investigate new designs studied on other wind/hydro turbines [200,201] as augmentation devices in CFWTs. 4. More numerical investigations are essential to address the fatigue behavior and acoustic, dynamic, and structural analysis of system components, which could help

Zephyr
A zephyr consists of 9 blades placed around the CFWT, as illustrated in Figure 25. Due to the special shape of its blades, the zephyr reduces the flow turbulence and changes the direction of wind flow to a certain angle so that the CFWT can absorb more energy. A CFD simulation using k-ɛ turbulence model and WTE shows that the zephyr can increase the CP from 0.098 to 0.12 [154,155].

The Importance of a Suitable Site Location
Site location is the essential and primary factor for understanding the wind behavior, selecting WTs' type and scale, designing the wind farms (WF), and measuring their effectiveness [156]. Figure 26 shows some of the best urban and non-urban WF locations. Before starting the construction of a WF, it is necessary to perform the WRA [157,158] to estimate the potential locations and identify wind characteristics accurately. The widely used methods of WRA include measurement [159], measure-correlate-predict [160], wind atlas methodology [161], Mesoscale modelling [162], and combined Mesoscale-Microscale modelling [163]. Also, in WRA, the uncertainty in the data that affects the WT output and capital expense (CAPEX) must be considered [158,164,165]. The choice of turbine type

Zephyr
A zephyr consists of 9 blades placed around the CFWT, as illustrated in Figure 25.
Due to the special shape of its blades, the zephyr reduces the flow turbulence and changes the direction of wind flow to a certain angle so that the CFWT can absorb more energy. A CFD simulation using k-ɛ turbulence model and WTE shows that the zephyr can increase the CP from 0.098 to 0.12 [154,155].

The Importance of a Suitable Site Location
Site location is the essential and primary factor for understanding the wind behavior, selecting WTs' type and scale, designing the wind farms (WF), and measuring their effectiveness [156]. Figure 26 shows some of the best urban and non-urban WF locations. Before starting the construction of a WF, it is necessary to perform the WRA [157,158] to estimate the potential locations and identify wind characteristics accurately. The widely used methods of WRA include measurement [159], measure-correlate-predict [160], wind atlas methodology [161], Mesoscale modelling [162], and combined Mesoscale-Microscale modelling [163]. Also, in WRA, the uncertainty in the data that affects the WT output and capital expense (CAPEX) must be considered [158,164,165]. The choice of turbine type

Zephyr
A zephyr consists of 9 blades placed around the CFWT, as illustrated in Figure 25.
Due to the special shape of its blades, the zephyr reduces the flow turbulence and changes the direction of wind flow to a certain angle so that the CFWT can absorb more energy. A CFD simulation using k-ɛ turbulence model and WTE shows that the zephyr can increase the CP from 0.098 to 0.12 [154,155].  [192] III CFD ANSYS RNG k-conical surfaces promote turbulent mixing above and below, the stator back pressure is reduced, and the WT power output is increased. The simulation results showed that the average CP and CT increased by about 30% to 35% compared to turbines without ODGV.

Zephyr
A zephyr consists of 9 blades placed around the CFWT, as illustrated in Figure 25.
Due to the special shape of its blades, the zephyr reduces the flow turbulence and changes the direction of wind flow to a certain angle so that the CFWT can absorb more energy. A CFD simulation using k-ɛ turbulence model and WTE shows that the zephyr can increase the CP from 0.098 to 0.12 [154,155]. Figure 25. A zephyr prototype. conical surfaces promote turbulent mixing above and below, the stator back pressure is reduced, and the WT power output is increased. The simulation results showed that the average CP and CT increased by about 30% to 35% compared to turbines without ODGV.

Zephyr
A zephyr consists of 9 blades placed around the CFWT, as illustrated in Figure 25.
Due to the special shape of its blades, the zephyr reduces the flow turbulence and changes the direction of wind flow to a certain angle so that the CFWT can absorb more energy. A CFD simulation using k-ɛ turbulence model and WTE shows that the zephyr can increase the CP from 0.098 to 0.12 [154,155].

Zephyr
A zephyr consists of 9 blades placed around the CFWT, as illustrated in Figure 25. Due to the special shape of its blades, the zephyr reduces the flow turbulence and changes the direction of wind flow to a certain angle so that the CFWT can absorb more energy. A CFD simulation using k-ɛ turbulence model and WTE shows that the zephyr can increase the CP from 0.098 to 0.12 [154,155].

The Importance of a Suitable Site Location
Site location is the essential and primary factor for understanding the wind behavior, selecting WTs' type and scale, designing the wind farms (WF), and measuring their effectiveness [156]. Figure 26 shows some of the best urban and non-urban WF locations. Before starting the construction of a WF, it is necessary to perform the WRA [157,158] to estimate the potential locations and identify wind characteristics accurately. The widely used methods of WRA include measurement [159], measure-correlate-predict [160], wind atlas methodology [161], Mesoscale modelling [162], and combined Mesoscale-Microscale modelling [163]. Also, in WRA, the uncertainty in the data that affects the WT output and capital expense (CAPEX) must be considered [158,164,165]. The choice of turbine type

Zephyr
A zephyr consists of 9 blades placed around the CFWT, as illustrated in Figure 25. Due to the special shape of its blades, the zephyr reduces the flow turbulence and changes the direction of wind flow to a certain angle so that the CFWT can absorb more energy. A CFD simulation using k-ɛ turbulence model and WTE shows that the zephyr can increase the CP from 0.098 to 0.12 [154,155].

The Importance of a Suitable Site Location
Site location is the essential and primary factor for understanding the wind behavior, selecting WTs' type and scale, designing the wind farms (WF), and measuring their effectiveness [156]. Figure 26 shows some of the best urban and non-urban WF locations. Before starting the construction of a WF, it is necessary to perform the WRA [157,158] to estimate the potential locations and identify wind characteristics accurately. The widely used methods of WRA include measurement [159], measure-correlate-predict [160], wind atlas methodology [161], Mesoscale modelling [162], and combined Mesoscale-Microscale modelling [163]. Also, in WRA, the uncertainty in the data that affects the WT output and capital expense (CAPEX) must be considered [158,164,165]. The choice of turbine type

HAWT and VAWT
Empirical-heuristic optimization of the roof shape, influence of the building aspect ratio and height of the surrounding buildings on wind flow characteristics. Positioning the WTs on the roof. Yang et al. (2016) [194] III CFD ANSYS Realizable k-

Zephyr
A zephyr consists of 9 blades placed around the CFWT, as illustrated in Figure 25. Due to the special shape of its blades, the zephyr reduces the flow turbulence and changes the direction of wind flow to a certain angle so that the CFWT can absorb more energy. A CFD simulation using k-ɛ turbulence model and WTE shows that the zephyr can increase the CP from 0.098 to 0.12 [154,155].

The Importance of a Suitable Site Location
Site location is the essential and primary factor for understanding the wind behavior, selecting WTs' type and scale, designing the wind farms (WF), and measuring their effectiveness [156]. Figure 26 shows some of the best urban and non-urban WF locations. Before starting the construction of a WF, it is necessary to perform the WRA [157,158] to estimate the potential locations and identify wind characteristics accurately. The widely used methods of WRA include measurement [159], measure-correlate-predict [160], wind atlas methodology [161], Mesoscale modelling [162], and combined Mesoscale-Microscale modelling [163]. Also, in WRA, the uncertainty in the data that affects the WT output and capital expense (CAPEX) must be considered [158,164,165]. The choice of turbine type

Zephyr
A zephyr consists of 9 blades placed around the CFWT, as illustrated in Figure 25. Due to the special shape of its blades, the zephyr reduces the flow turbulence and changes the direction of wind flow to a certain angle so that the CFWT can absorb more energy. A CFD simulation using k-ɛ turbulence model and WTE shows that the zephyr can increase the CP from 0.098 to 0.12 [154,155].

The Importance of a Suitable Site Location
Site location is the essential and primary factor for understanding the wind behavior, selecting WTs' type and scale, designing the wind farms (WF), and measuring their effectiveness [156]. Figure 26 shows some of the best urban and non-urban WF locations. Before starting the construction of a WF, it is necessary to perform the WRA [157,158] to estimate the potential locations and identify wind characteristics accurately. The widely used methods of WRA include measurement [159], measure-correlate-predict [160], wind

Zephyr
A zephyr consists of 9 blades placed around the CFWT, as illustrated in Figure 25. Due to the special shape of its blades, the zephyr reduces the flow turbulence and changes the direction of wind flow to a certain angle so that the CFWT can absorb more energy. A CFD simulation using k-ɛ turbulence model and WTE shows that the zephyr can increase the CP from 0.098 to 0.12 [154,155].

The Importance of a Suitable Site Location
Site location is the essential and primary factor for understanding the wind behavior, selecting WTs' type and scale, designing the wind farms (WF), and measuring their effectiveness [156]. Figure 26 shows some of the best urban and non-urban WF locations. Before starting the construction of a WF, it is necessary to perform the WRA [157,158] to reduced, and the WT power output is increased. The simulation results showed that the average CP and CT increased by about 30% to 35% compared to turbines without ODGV.

Zephyr
A zephyr consists of 9 blades placed around the CFWT, as illustrated in Figure 25. Due to the special shape of its blades, the zephyr reduces the flow turbulence and changes the direction of wind flow to a certain angle so that the CFWT can absorb more energy. A CFD simulation using k-ɛ turbulence model and WTE shows that the zephyr can increase the CP from 0.098 to 0.12 [154,155].

The Importance of a Suitable Site Location
Site location is the essential and primary factor for understanding the wind behavior, selecting WTs' type and scale, designing the wind farms (WF), and measuring their effectiveness [156]. Figure 26 shows some of the best urban and non-urban WF locations. Be--Investigating the Venturi effect in urban environments with convergent and divergent inlet mode buildings. conical surfaces promote turbulent mixing above and below, the stator back pressure is reduced, and the WT power output is increased. The simulation results showed that the average CP and CT increased by about 30% to 35% compared to turbines without ODGV.

Zephyr
A zephyr consists of 9 blades placed around the CFWT, as illustrated in Figure 25. Due to the special shape of its blades, the zephyr reduces the flow turbulence and changes the direction of wind flow to a certain angle so that the CFWT can absorb more energy. A CFD simulation using k-ɛ turbulence model and WTE shows that the zephyr can increase the CP from 0.098 to 0.12 [154,155]. conical surfaces promote turbulent mixing above and below, the stator back pressure is reduced, and the WT power output is increased. The simulation results showed that the average CP and CT increased by about 30% to 35% compared to turbines without ODGV.

Zephyr
A zephyr consists of 9 blades placed around the CFWT, as illustrated in Figure 25. Due to the special shape of its blades, the zephyr reduces the flow turbulence and changes the direction of wind flow to a certain angle so that the CFWT can absorb more energy. A CFD simulation using k-ɛ turbulence model and WTE shows that the zephyr can increase the CP from 0.098 to 0.12 [154,155].

H-Darrieus
Study wind conditions on the roof and behavior of a roof-mounted H-Darrieus with respect to optimal energy efficiency.

Challenges and Future Scopes
An overview of numerical and experimental investigations has indicated that the performance of CFWTs depends on various parameters, and the results are improving and promising. Further, there are many untouched gaps for researchers to address in the future:

1.
Although the effect of geometrical parameters on turbine efficiency has been investigated, there is a lack of studies on aspect ratio and twisting angle of blades.

2.
As discussed earlier, adding an augmentation device is essential for increasing the C P . However, they increase the total weight and design complexity. The appropriate type of augmentation choice depends on the analysis of the wind rose, project costs, installation method (HAWT or VAWT), and acceptable vibration, as well as noise.
Studies have yet to fill this gap.

3.
There is a scope to investigate new designs studied on other wind/hydro turbines [200,201] as augmentation devices in CFWTs.

4.
More numerical investigations are essential to address the fatigue behavior and acoustic, dynamic, and structural analysis of system components, which could help improve the device performance and likewise reduce the noise and cost.

5.
Systematic studies for the utilization of CFWTs are needed at the WF scale in rural buildings or urban high-rise buildings to see the technical feasibility of generating power from CFWTs under the influence of surrounding obstacles.

Conclusions
Although the eminent advantages of CFWTs, such as simple design, remarkable stability, self-starting ability, low noise, and cut-in speed, make them a golden option for building energy systems as a SSWT, they has been suffering from low efficiency. This paper reviews the optimization studies focusing on the design and the performance improvement of the CFWT, as well as building-mounted WTs for energy harvesting. The literature survey shows that many research projects attempted to enhance the CFWT efficiency by modifying its geometric characteristics or designing augmentation devices for that. The key findings of this literature review are as follows: 1.
The output of the CFWT depends on the geometrical parameters, namely angle, thickness, and circumferential length of the blade, rotor diameter ratio, and the number of blades as well as stages. If the WF scale is considered, parameters such as turbine arrangement, type of installation (VAWT or HAWT), the distance between turbines, and the direction of rotation of each one become important.

2.
In most studies, 12 and 16 blades were recommended, which can lead to the highest performance. Additionally, the double-stage rotor and 12 • phase shift angle provide a good value of C P and reduce the negative torque.

3.
Selecting an appropriate TSR range can maximize C P for various configurations.

4.
In a linear configuration, two turbines with opposite rotation directions and at a 2.5D distance from each other reach the highest C P (D represents the outer diameter of CFWT). In a farm configuration, four turbines located in a staggered arrangement within the distance S1:S2 of 0.5D:0.5D have the highest power density. Further, using the CFWT as a single rotor in VAWT is a better arrangement than using the CFWT as 5 blades in HAWT.

5.
Augmentation devices include guide nozzle, casing, windshield, guide vane, deflector, cowling, ODGV, and zephyr. They reduce negative torque by preventing the wind flow from hitting the convex part of the blades or converging the wind flow, thereby increasing the C P . Based on their advantages/disadvantages and previous discussions in the literature on efficiency improvement, ODGV and guide nozzle have the best effect on CFWT performance, as they have caused an increase of 147% and 152%, respectively, in C P compared to the rotor without any augmentation device. 6.
Most of the research focused on the application of CFWTs has investigated this turbine in busy highways and airport runways. Nevertheless, CFWTs can be effectively integrated with buildings and harvest reasonable power output. Although the efficiency is not yet dramatically high, it could result in acceptable cost-effectiveness levels in areas with high annual wind capacity factors.
A gap has also been observed in studies on the effect of fatigue behavior and acoustic, dynamic, and structural analysis of system components, which may help improve the performance of such turbines. Studying other geometrical parameters (aspect ratio and twisting angle of blades), choosing an appropriate type of augmentation device based on various factors, investigating or innovating new designs as augmentation for CFWTs, and simulating at the WF scale in rural buildings or urban high-rise buildings are some of the shortcomings of the literature to be addressed by the research community in the future.
Understanding these all and considering the thorough information presented in the paper about CFWTs from different perspectives, one could say that this literature review could assist researchers and developers in selecting and optimizing system parameters for CFWT configurations.
-ω SST model are: β * = 0.09, β1 = 0.075, β2 = 0.0828, γ1 1.0, σω1 = 0.5, σω2 = 0.856, and a1 = 0.31. λ) measures the linear velocity of the blade tip (U) n as [58]: lationship between total wind power (PW) and wind and rotates them around the turbine axis. As a result, generates AC power. The general relationship beer is established by a factor called CP, a variable pa-TSR. Theoretically, the maximum CP can be up to the nship is shown in Equation (32), and the CT is calcu-.