Bill Hillier’s Legacy: Space Syntax—A Synopsis of Basic Concepts, Measures, and Empirical Application

: Bill Hillier’s space syntax method and theory enables us to describe the spatial properties of a sustainable city. Empirical testing of the space syntax method over time has conﬁrmed the capacity and innovativeness of analyzing spatial relationships with the purpose of understanding and explaining the socio-spatial organization of built environments. However, the conceptual framework of space syntax elements is scattered around in various academic writings. This article, therefore, gives a holistic and compact overview of the various concepts that are used in space syntax, from its basic elements to various analytical techniques and theories. To achieve this compact overview, we reviewed all space syntax literature accessible since the 1970s for ﬁnding core references to various concepts used in space syntax. Following a short description of its foundation and evolution through the work of Bill Hillier, we explain its basic concepts and measures in the form of an extended glossary. Explanations are enriched with various space syntax analyses and scenario testing on various scales that were applied to the city of Rotterdam in the Netherlands. We conclude with a discussion about the advantages and limitations of space syntax and about how this method adds value to the creation of sustainable cities.


Introduction to Space Syntax
Bill Hillier (1937Hillier ( -2019 was the pioneer of space syntax. His contribution to understanding the built environment through an operational method to analyze spatial relationships between built objects allowed for a new refined knowledge about the relationship between space and society. In contrast to other techniques for the analysis of space, it combines tangible factors (movement and land use) with intangible factors (cognition and behavior). The first approach of the space syntax method originated from the 1970s. Over the years, Bill Hillier and his colleagues at the Bartlett School of Architecture, University College London, contributed to the improvement of the space syntax theory and method. At present, space syntax is applied worldwide in research and in practice. Space syntax provides precision with reference to spatial concepts and to various analytical techniques that facilitate the description of the spatial features of a sustainable city. The concepts and the analytical techniques already exist. The current challenge is to apply these tools to planning practice to improve sustainable built environments [1,2].
The space syntax method builds upon graph theory from discrete mathematics for the calculation of configurative spatial relationships between streets in the built environ-diagnosis and prognosis accommodates an indication of future socioeconomic impacts of urban design proposals. The predictive capacity of space syntax analysis renders it an attractive methodology for urban planning and design. It contributes to an evaluation of spatial effects on locations of economic activity and the degree of vitality of urban centers [17][18][19][20][21][22][23]. It further allows an insight into complex spatial realities as part of a city's self-organizing process [24]. Yet, aside from its predictive capability, it can be applied to indicate how an urban system functions in retrospect, for 'postdicting' certain social aspects of past urban configurations [25][26][27][28][29][30].
The robust methodological foundation of space syntax is the existence of a correlation between pedestrian movement, vehicular movement, and the configuration of the spatial layout [15,16]. Space syntax is applied at many scales, from the arrangement of interior spaces [3,6,[31][32][33] to large metropolitan areas [34][35][36][37][38]. Space syntax research ranges from anthropology and cognitive and social sciences to applied mathematics and informatics and has even touched upon philosophical issues. Examples on disciplines where space syntax has been applied are: anthropology, archaeology, architecture, urban planning and design, geography, psychology (wayfinding and perception of safety), sociology, criminology, real estate development, road engineering, and philosophy.

Hillier's Engagement in Research, Education, and Practice
Bill Hillier was not only pioneering the space syntax method, he also actively contributed to its further development, to the education of students and to practice. As the successor of John Musgrove at The Bartlett, he established the new Advanced Architectural Studies (AAS) Master's program in 1973, now the Space Syntax: Architecture & Cities MSc program. Hillier was an advocate of research-led education and he was in favor of letting his students experience first-hand that space is something active, as demonstrated by his popular walking lectures in the city of London. Over the years, these walking lectures were also offered to the wider public as part of events such as the Architecture Festival London. Hillier was able to clearly illustrate his ideas to make them accessible to anyone who was interested.
When, around the turn of the millennium, he was working on the concept of centrality, Hillier introduced the example of the balloons at eye height that were attached to a string with a weight. He used this example to demonstrate how these balloons were located in the most central location in a room to illustrate how an object can block visibility. He borrowed this idea from his then three-year-old grandson, who was playing with balloons at a family gathering, positioning them in such a way that family members could not see each other. Every time an adult brushed the balloons away, Bill's grandson would put them back in place as part of his game. At AAS's 40th anniversary event, the balloons were a central element of the celebration decorations ( Figure 1).
In 1989, after 15 years of research and teaching, Bill Hillier, together with his colleagues, founded Space Syntax Limited London (https://spacesyntax.com, accessed on 24 January 2021). Since then, his theories and methods have been applied in practice worldwide. One of the most successfully realized urban renewal projects is Trafalgar Square in London. In addition, international space syntax symposia have been held since 1997, in alternate years, with increasing global interest. The original reason for organizing the first symposium was to keep in contact with international and British AAS alumni. The increasing integration and application of space syntax in research, education, and practice shows that space syntax has become a well-recognized method of urban analysis and contributes to an understanding of the relationship between socioeconomic effects and the analytical design of the built environment. In 1989, after 15 years of research and teaching, Bill Hillier, together with his co leagues, founded Space Syntax Limited London (https://spacesyntax.com, accessed on 2 January 2021). Since then, his theories and methods have been applied in practice world wide. One of the most successfully realized urban renewal projects is Trafalgar Square i London. In addition, international space syntax symposia have been held since 1997, i alternate years, with increasing global interest. The original reason for organizing the firs symposium was to keep in contact with international and British AAS alumni. The in creasing integration and application of space syntax in research, education, and practic shows that space syntax has become a well-recognized method of urban analysis and con tributes to an understanding of the relationship between socioeconomic effects and th analytical design of the built environment.
In this article, we present the various concepts and terms that are used in space syn tax, given that most of them are scattered among various academic and professional wri ings. These concepts are very useful for the development of precise operational analytica techniques, which have contributed to precise descriptions of the built environment's spa tial properties. The space syntax concepts that are used for further clarification and illus tration have been applied to the city of Rotterdam in the Netherlands. Some readers ma already be familiar with the case study of Rotterdam since it was used as a test case b In this article, we present the various concepts and terms that are used in space syntax, given that most of them are scattered among various academic and professional writings. These concepts are very useful for the development of precise operational analytical techniques, which have contributed to precise descriptions of the built environment's spatial properties. The space syntax concepts that are used for further clarification and illustration have been applied to the city of Rotterdam in the Netherlands. Some readers may already be familiar with the case study of Rotterdam since it was used as a test case by some authors in various space syntax workshops over the years.
Consequently, this article is structured as follows. In Section 2, we present basic concepts through the logic of a glossary. These concepts have been used in various space syntax analyses that have been developed throughout the years. The explanations are supplemented by an application of these concepts to the city of Rotterdam. Furthermore, prominent techniques for gathering useful primary data for verification, triangulation, or correlation of space syntax results will be presented. Subsequently, in Section 3, we present theories and accompanying understandings of space and society that developed through space syntax research. In Section 4, we demonstrate how space syntax can be applied as a tool in urban analytical design for scenario development and option testing. In Section 5, we discuss the advantages and limitations of space syntax. The paper concludes by explaining the added value of, and therefore recommending, space syntax analysis for the creation of sustainable cities.

Method and Data: Basic Concepts in Space Syntax Analysis and Primary Data Collection
In this section, an overview and an explanation of main space syntax concepts are presented in the form of a glossary. The organization of this glossary is not alphabetical but follows the logic of how the space syntax method developed. We reviewed all space syntax literature accessible since the 1970s for finding core references to various concepts used in space syntax. We first explain the classic space syntax concepts and measures as applied solely until 2005. Software development, increasing computational power, and further developed mathematical applications led to new discoveries and the understanding of additional phenomena that yielded new concepts and terms.
Research on metropolitan cities and regions in particular have undergone the biggest improvements since the millennium. This glossary extends and updates the work of Klaqvist [39] and Vaughan [40], in line with the seminal open access textbook on space syntax from van Nes and Yamu [4] (free download: https://www.springer.com/gp/book/ 9783030591397, accessed on 24 February 2021). Furthermore, we provide an overview of the most useful primary data for verification, triangulation and correlation of space syntax results.

•
Convex space: A convex space is defined as a space that covers "all points (locations) within that space can be joined to all others without going outside the boundary of that space." [5] (p. 68). In other words, two people can see each other when they are located in any spot within a particular convex space. Intervisibility is essential for identifying a convex space. Convex space is mostly occupied by place-bound functions and human activities such as standing and sitting.

•
Convex map: For spatial analysis, convex maps are used to analyze spaces inside buildings and the public spaces between groups of buildings in a neighborhood or a small village. The analytical scale ranges from architectural space to a neighborhood's public realm. The convex map is replaced by the axial map in urban studies; simply because an axial map can be generated and drawn much faster than a convex map. Moreover, the analytical results of a convex analysis comply with those from an axial analysis [5] (p. 68). Regarding buildings and small urban neighborhoods, a grid-based map to compute visual graph analysis (VGA; see Section 2.2) replaced the convex map. • Axial line: An axial line is the longest sightline that indicates a movement path in a certain space within the built environment. In urban studies, each axial line represents a public urban space that connects to other public urban spaces [5] (p. 97).

•
Axial map: An axial map of a built environment is the set of the longest and the fewest axial lines [5] (pp. 17, 91, 97), [41]. An axial map can be of different resolutions: low, medium or high. A low-resolution model, or strategic model, includes only the major relationships between aspects of the built environment. A medium-resolution model is an extension to which more pragmatic relations of built-up and non-builtup features are added. A high-resolution model, or pedestrian model, involves the study of the precise paths of pedestrian movement. The major difference between the high-resolution model and the other two models is that the pavement will be the focal point for drawing an axial map. Furthermore, hybrid models exist, which combine different resolutions for different areas in a city.

•
Isovist field: An isovist field is a visualization of the panoptic view of a viewer from a particular point in the built environment [42]. It is a field of vision [43]. An isovist field can be explained as a visual record of what can be seen in a 360-degree or a 180-degree view from a given point [17]. Figure 2 shows the three basic elementary spatial units that are used in space syntax. Figure 3 shows three different types of basic maps that are used in computational space syntax analyses. Convex maps (Figure 3c) are drawn by hand and this can be timeconsuming and is not free from individual judgement. Generating an axial map manually also requires training and experience to model the least and the longest axial lines possible in a neighborhood or a city (Figure 3b). Therefore, the raster-based map (Figure 3d) that is applied to all public spaces turns out to be the least time-consuming to apply compared to a convex map or an axial map [44]. different resolutions for different areas in a city.

•
Isovist field: An isovist field is a visualization of the panoptic view of a viewer from particular point in the built environment [42]. It is a field of vision [43]. An isovi field can be explained as a visual record of what can be seen in a 360-degree or a 18 degree view from a given point [17]. Figure 2 shows the three basic elementary spatial units that are used in space synta Figure 3 shows three different types of basic maps that are used in computational spa syntax analyses. Convex maps (Figure 3c) are drawn by hand and this can be time-co suming and is not free from individual judgement. Generating an axial map manual also requires training and experience to model the least and the longest axial lines possib in a neighborhood or a city (Figure 3b). Therefore, the raster-based map (Figure 3d) th is applied to all public spaces turns out to be the least time-consuming to apply compare to a convex map or an axial map [44].

•
Urban grid: This is the pattern of public spaces that links the buildings of a settlemen regardless of its degree of geometric regularity [45] (p. 02.1).

•
Justified graph (j-graph): A justified graph illustrates the spatial relationships or co nections between various spaces as a directional graph. Each space is represented b a node (=vertex or point; in space syntax this is the street itself), while a connectio between two nodes is represented by an edge (=line) [46]. In order to generate a ju tified graph, only the spatial configurational relationship is taken into consideratio different resolutions for different areas in a city.

•
Isovist field: An isovist field is a visualization of the panoptic view of a viewer from a particular point in the built environment [42]. It is a field of vision [43]. An isovist field can be explained as a visual record of what can be seen in a 360-degree or a 180degree view from a given point [17]. Figure 2 shows the three basic elementary spatial units that are used in space syntax. Figure 3 shows three different types of basic maps that are used in computational space syntax analyses. Convex maps (Figure 3c) are drawn by hand and this can be time-consuming and is not free from individual judgement. Generating an axial map manually also requires training and experience to model the least and the longest axial lines possible in a neighborhood or a city (Figure 3b). Therefore, the raster-based map (Figure 3d) that is applied to all public spaces turns out to be the least time-consuming to apply compared to a convex map or an axial map [44].

•
Urban grid: This is the pattern of public spaces that links the buildings of a settlement, regardless of its degree of geometric regularity [45] (p. 02.1).

•
Justified graph (j-graph): A justified graph illustrates the spatial relationships or connections between various spaces as a directional graph. Each space is represented by a node (=vertex or point; in space syntax this is the street itself), while a connection between two nodes is represented by an edge (=line) [46]. In order to generate a justified graph, only the spatial configurational relationship is taken into consideration. • Urban grid: This is the pattern of public spaces that links the buildings of a settlement, regardless of its degree of geometric regularity [45] (p. 02.1).

•
Justified graph (j-graph): A justified graph illustrates the spatial relationships or connections between various spaces as a directional graph. Each space is represented by a node (=vertex or point; in space syntax this is the street itself), while a connection between two nodes is represented by an edge (=line) [46]. In order to generate a justified graph, only the spatial configurational relationship is taken into consideration. A j-graph does not display geometric properties. An axial map is the geometric model of an urban street network that can translate into a j-graph. • Depth: The depth of a node in a j-graph is the number of edges in the path from the root node to the chosen node. For instance, the depth of the root is 0 and the depth of any one of its adjacent nodes is 1 [46]. A path that has a high number of nodes from the root node to the final node is topologically deep and, vice versa, a path that has a low number of nodes is topologically shallow.
• Total depth (TD): This is defined by the number of spaces to pass through from a chosen or a given starting point in the system. The total depth of a system is the sum of all possible steps from a given starting point. The depth value, when combined with the actual shape of the system itself, provides important information for the interpretation and analysis of an urban space. The terms 'shallow' and 'deep' are most commonly used with regard to the depth of a system. A shallow system has a low total depth value, whereas a deep system has a high total depth value. The j-graph of a shallow system is bush-like and for a deep system it is tree-like [5] (p. 94).  Figure 4d, a j-graph (justified graph) is shown, using the main street as the root node A.

•
Depth: The depth of a node in a j-graph is the number of edges in the path from the root node to the chosen node. For instance, the depth of the root is 0 and the depth of any one of its adjacent nodes is 1 [46]. A path that has a high number of nodes from the root node to the final node is topologically deep and, vice versa, a path that has a low number of nodes is topologically shallow. • Total depth (TD): This is defined by the number of spaces to pass through from a chosen or a given starting point in the system. The total depth of a system is the sum of all possible steps from a given starting point. The depth value, when combined with the actual shape of the system itself, provides important information for the interpretation and analysis of an urban space. The terms 'shallow' and 'deep' are most commonly used with regard to the depth of a system. A shallow system has a low total depth value, whereas a deep system has a high total depth value. The j-graph of a shallow system is bush-like and for a deep system it is tree-like [5] (p. 94). Figure 4 depicts how public spaces are abstracted as axial lines and make up an axial map 4 (b) of a settlement 4 (a). The spatial analysis 4 (c) presents the visualization of a global integration analysis of the axial map of the settlement. Below in Figure 4d, a j-graph (justified graph) is shown, using the main street as the root node A.

•
Connectivity: Connectivity is a static local measure and explains the number of connections that each street has to its direct neighboring streets. In mathematics, connectivity is one of the basic concepts of graph theory. A street with many connections to its side streets has a high connectivity value, whereas a street with few connections has a low connectivity value [5] (p. 103), [39]. • Axial integration (Int): This measure considers to-movement and estimates the degree of accessibility that a street has to all other streets in the urban system, taking into consideration the total number of direction changes (syntactic steps) of an urban entity [5] (p. 104). Axial integration is strongly related to connectivity. The fewer the direction changes of a certain street to all other streets in the system, the higher its integration, hence its inter-accessibility. In short, the longer the axial line in an urban area, the higher its connectivity to other lines and the higher its integration value and vice versa. • Global and local radii: Classic space syntax analyses generally use a topological radius, which refers to the number of direction changes. For the 'global' integration analysis (as coined in space syntax jargon), a radius of n is applied, whereas in the local integration analysis, radii of 3 or 5 are generally applied [7]. Global axial integration analysis, also referred to as citywide integration analysis, calculates how every axial line is connected to all others in a built environment in terms of the total number of direction changes to all other axial lines [3] (p. 135). In contrast, local axial integration analysis calculates how every axial line is connected to its neighboring streets in a built environment in terms of the given number of direction changes. It is important to note that the local radius was originally calculated by taking the root node into consideration. That means, for example, that a radius of 3 was calculated with two direction changes from the root node (=two syntactic steps + the root node). This changed after 2005, when the root node was no longer included. Consequently, a radius of 3 currently equals three direction changes (=three syntactic steps). Local integration analysis contributes to reducing the edge effect that appears in a global integration analysis. Figure 5 explains how to calculate axial integration for topologically shallow and deep systems using the example of the settlement from Figure 4. We demonstrate how axial integration is computed. The bush-like j-graph with the main street as the root node is topologically shallower compared to the drawn-out j-graph with the back street as the root node. The main street can reach all streets with a low total number of direction changes, whereas the back street can reach all streets with a high number of direction changes.
To illustrate the application of basic space syntax concepts we used the case study of Rotterdam. Rotterdam is a major port city in the province of South Holland and the second largest city in the Netherlands. It has a population of approximately 650,000 and is known for its multi-ethnic mix. The near-complete destruction of the historic city center in WWII led to Rotterdam's current urban landscape with modern architecture and skyscrapers. Figure 6 shows three different types of axial analyses of Rotterdam. The global integration analysis (Figure 6c) shows where the most spatially integrated streets are located. For Rotterdam, the most integrated streets and roads are located on the ring road's eastern sections. The red and orange axial lines show the 5% score of the most highly integrated streets. The local integration with a radius of 3 ( Figure 6d) depicts the most integrated streets locally. In this analysis, the various local shopping streets are indicated by yellow and orange lines. The connectivity map ( Figure 6b) shows how many direct connections each axis has to its direct neighboring axes. The dark blue lines have one to two connections, whereas the yellow and red lines have up to 32 connections. To illustrate the application of basic space syntax concepts we used the case study of Rotterdam. Rotterdam is a major port city in the province of South Holland and the second largest city in the Netherlands. It has a population of approximately 650,000 and is known for its multi-ethnic mix. The near-complete destruction of the historic city center in WWII led to Rotterdam's current urban landscape with modern architecture and skyscrapers. Figure 6 shows three different types of axial analyses of Rotterdam. The global integration analysis (Figure 6c) shows where the most spatially integrated streets are located. For Rotterdam, the most integrated streets and roads are located on the ring road's eastern sections. The red and orange axial lines show the 5% score of the most highly integrated streets. The local integration with a radius of 3 (Figure 6d) depicts the most integrated streets locally. In this analysis, the various local shopping streets are indicated by yellow and orange lines. The connectivity map (Figure 6b) shows how many direct connections each axis has to its direct neighboring axes. The dark blue lines have one to two connections, whereas the yellow and red lines have up to 32 connections. • A syntactic step: This refers to a single direction change in an urban system. For example, two syntactic steps mean two direction changes. Three syntactic steps mean three direction changes [46]. • Two-step analysis: This type of analysis illustrates how many streets can be reached within two direction changes from a particular street or road or from a chosen set of streets and roads. This analysis method is mostly used to find out about a shopping street's local catchment area [46]. • N-step analysis or point depth analysis: This type of analysis shows how topologically deep all streets and roads are in relation to one particular street or several particular streets in terms of number of direction changes. The higher the number of direction changes from a chosen street or a set of chosen streets, the topologically deeper an area is [47]. Figure 7 shows a two-step analysis of the Lijnbaan, one of the main shopping streets in the center of Rotterdam. The red axial line (Figure 7b) indicates the starting point for the analysis. The two-step analysis visualizes how many streets can be reached within two direction changes from the origin of the Lijnbaan and depicts the Lijnbaan's local catchment area. Shopping streets often have high numbers of streets that are located within two direction changes [20,46]. Even though the Lijnbaan's location is spatially 'hidden' (Figure 7a), its connectivity within its local catchment area is high. Sustainability 2021, 13, x FOR PEER REVIEW 10 of 26 • A syntactic step: This refers to a single direction change in an urban system. For example, two syntactic steps mean two direction changes. Three syntactic steps mean three direction changes [46]. • Two-step analysis: This type of analysis illustrates how many streets can be reached within two direction changes from a particular street or road or from a chosen set of streets and roads. This analysis method is mostly used to find out about a shopping street's local catchment area [46].  The two-step analysis visualizes how many streets can be reached within two direction changes from the origin of the Lijnbaan and depicts the Lijnbaan's local catchment area. Shopping streets often have high numbers of streets that are located within two direction changes [20,46]. Even though the Lijnbaan's location is spatially 'hidden' (Figure 7a), its connectivity within its local catchment area is high. • Intelligibility: This is a measure of the correlation between citywide integration and connectivity values [48,49], or, more generally, the correlation between global and local integration values [14], that indicates how comprehensible an urban system is.
The closer the correlation coefficient (R 2 ) is to 1.0, the higher a system's level of intel- • Intelligibility: This is a measure of the correlation between citywide integration and connectivity values [48,49], or, more generally, the correlation between global and local integration values [14], that indicates how comprehensible an urban system is. The closer the correlation coefficient (R 2 ) is to 1.0, the higher a system's level of intelligibility. This means that, based on the street pattern logic of a local area, an entire city can be understood. The concept of intelligibility also refers to cognitive mapping, which is connected to Kevin Lynch's concept of legibility [50]. Figure 8 shows the scatter plot of the local integration (Int r = 3) versus the global integration (Int r = n) of Rotterdam. The black pixels represent the streets (=axial lines) in the main center of Rotterdam. Even though Rotterdam's center was heavily bombed in World War II, the original street pattern was kept during the rebuilding of the city center. The correlation coefficient (R 2 ) for the whole city is 0.1359, which is low. The correlation coefficient (R 2 ) for the city center is average with 0.4398.

•
Intelligibility: This is a measure of the correlation between citywide integrati connectivity values [48,49], or, more generally, the correlation between glob local integration values [14], that indicates how comprehensible an urban sys The closer the correlation coefficient (R 2 ) is to 1.0, the higher a system's level o ligibility. This means that, based on the street pattern logic of a local area, an city can be understood. The concept of intelligibility also refers to cognitive ma which is connected to Kevin Lynch's concept of legibility [50]. Figure 8 shows the scatter plot of the local integration (Int r = 3) versus the integration (Int r = n) of Rotterdam. The black pixels represent the streets (=axial li the main center of Rotterdam. Even though Rotterdam's center was heavily bom World War II, the original street pattern was kept during the rebuilding of the city The correlation coefficient (R 2 ) for the whole city is 0.1359, which is low. The corr coefficient (R 2 ) for the city center is average with 0.4398. •

Radius-radius (RadR):
The radius-radius measure was set up to minimize th effect for a whole spatial system. Radius-radius calculations, which were pop the past, work with mean depth in the sense that this represents the real-life ch of a utilization pattern. Radius-radius analysis is an axial integration analys uses the mean of the mean depth values of the most globally integrated axial l the system, using this as the maximum radius. This is done to reduce the edg [3] (p. 120). • Radius-radius (RadR): The radius-radius measure was set up to minimize the edge effect for a whole spatial system. Radius-radius calculations, which were popular in the past, work with mean depth in the sense that this represents the real-life character of a utilization pattern. Radius-radius analysis is an axial integration analysis that uses the mean of the mean depth values of the most globally integrated axial lines in the system, using this as the maximum radius. This is done to reduce the edge effect [3] (p. 120).

•
Integration gradient: This was a first attempt at drawing up an equation for the identification of main routes in a city. It takes the local integration into account in the calculation. An integration gradient of r = 3 with real relative asymmetry (RRA) is calculated as follows: (RRA3)/average{average{RRA3}} [51]. Angular choice analysis (see Section 2.2) replaced the integration gradient calculations. • Constituted and unconstituted street and urban spaces: When a street or urban space has entrances that are directly connected to it from adjacent buildings, the street or urban space is constituted. An unconstituted street or urban space has no entrances connected to it [5]  Similarly, the Agora Technology Platform report [52] mentions that a vehicular axial map would select an area encompassing a 30-min drive from the area of interest. Consequently, vehicular maps are quite large and often depict the whole city under investigation.

More Recent Concepts and Measures
In 2004, Carlo Ratti published an article on some inconsistencies in the space syntax method [53]. Ratti criticized the lack of metric properties in space syntax in particular. In 2005, some of these inconsistencies were resolved and the results were presented at the 5th International Space Syntax Symposium. The late Alasdair Turner presented an updated version of the Depthmap software, which incorporated an angular analysis that was formulated and presented at the 3rd International Space Syntax Symposium [54]. In addition, Nick Dalton contributed to the angular weighting of the axial map in the test software Meanda [55]. The solution for successful computational angular analysis with various local radii was to break down the axial map into a segment map and to incorporate segment length into the calculations [17]. This operation can be performed with the Depthmap software. Later, in 2012, Hillier, Yang, and Turner presented the equation for normalizing two principal measurements in space syntax: angular choice and segment integration analyses [9]. They are referred to as normalized angular choice (NACH) and normalized angular integration (NAIN), respectively.
• Segment map: To create a segment map, the axial map is broken down into segments at each street intersection [17]. In recent years, the use of georeferenced road-center lines became more popular for the generation of a street network model. Turner proved that a georeferenced street network model that uses road-center lines can be used when calculating segment angular choice and integration. The computed values for each street segment differ within an acceptable range between a segment map that is derived from a road-center line and an axial map [56].

•
Angular segment integration: This shows how integrated each street segment is in relation to all others in terms of the total number of direction changes. The segment length is included in the calculations to be able to analyze local segment integrations with various metric radii [9]. The angular segment integration analysis shows the to-movement potentials in an urban system. • Angular choice: This shows how integrated each street segment is in relation to all others in terms of the lowest total number of angular deviations. Here again, the segment length is included in the calculations to enable local choice analyses with different metrical radii [7]. The angular choice analysis shows the through-movement potentials in an urban system. Figure 9 shows how the angular total depth (TD) and the angular mean depth (MD) are calculated for street segment A. Figure 9 shows the angular weighting that affects the nodes of the j-graph to the left. ment length is included in the calculations to enable local choice analyses with dif ferent metrical radii [7]. The angular choice analysis shows the through-movemen potentials in an urban system. Figure 9 shows how the angular total depth (TD) and the angular mean depth (MD are calculated for street segment A. Figure 9 shows the angular weighting that affects the nodes of the j-graph to the left. • Angular total depth: The total number of angular deviations from each street segments to all others [54]. • Angular mean depth: The mean depth, based on the total depths of all calculated stree segments in a system [54].

•
Normalized angular integration (NAIN): Angular segment integration measures to movement potentials. Segment connectivity forms the basis for calculating angula integrations. It differs from axial integration in that it is more 'fine-tuned' and there fore depicts reality in greater detail. Normalized angular integration normalizes an gular total depth by comparing the system to the urban average [9]. • Normalized angular choice (NACH): Angular choice analysis depicts the potentia through-movement and, therefore, an urban route hierarchy. Angular choice is an angle-weighted graph that is computed by using a segment map. Normalized angu lar choice is calculated by dividing the total choice by the total depth for each segmen in the system. A metric radius is often applied to angular choice. Radii of 400, 800, o 1200 m refer to a 5-, 10-, or 20-min walk, respectively. Therefore, by applying more local radii, main routes are highlighted that run through or between neighborhoods in a city [9]. Normalized angular choice adjusts choice values and allows a solution to the paradox that a segregated design adds more total (and average) choice to the system than an integrated one [9].
NAIN and NACH yield: • Angular total depth: The total number of angular deviations from each street segments to all others [54]. • Angular mean depth: The mean depth, based on the total depths of all calculated street segments in a system [54]. • Normalized angular integration (NAIN): Angular segment integration measures tomovement potentials. Segment connectivity forms the basis for calculating angular integrations. It differs from axial integration in that it is more 'fine-tuned' and therefore depicts reality in greater detail. Normalized angular integration normalizes angular total depth by comparing the system to the urban average [9]. • Normalized angular choice (NACH): Angular choice analysis depicts the potential through-movement and, therefore, an urban route hierarchy. Angular choice is an angle-weighted graph that is computed by using a segment map. Normalized angular choice is calculated by dividing the total choice by the total depth for each segment in the system. A metric radius is often applied to angular choice. Radii of 400, 800, or 1200 m refer to a 5-, 10-, or 20-min walk, respectively. Therefore, by applying more local radii, main routes are highlighted that run through or between neighborhoods in a city [9]. Normalized angular choice adjusts choice values and allows a solution to the paradox that a segregated design adds more total (and average) choice to the system than an integrated one [9].
NAIN and NACH yield: Figure 10 shows the normalized angular integration (NAIN) and the normalized angular choice (NACH) analyses of Rotterdam with both low and high metric radii. NB: Not-georeferenced maps work with a local radius of 10% of the whole urban system size. In cases where the axial and the segment maps were georeferenced for Rotterdam, a radius of between 400 and 600 meters was used for the local scale and a radius of between 4000 and 6000 meters was used for a city or a metropolitan scale. Figure 10a,b show the citywide and the local to-movement potentials, respectively. For the citywide to-movement, the two centers of Rotterdam on each side of the river are highlighted. In addition, the local radius analysis depicts the various local shopping streets. The analyses in Figure 10c,d highlight the streets with the highest through-movement potentials citywide and locally, respectively. This shows that the citywide NACH analysis highlights the main route network, whereas the most vital pedestrian-based main routes are highlighted in the local NACH analysis. ment, the two centers of Rotterdam on each side of the river are highlighted. In addition the local radius analysis depicts the various local shopping streets. The analyses in Figure  10c,d highlight the streets with the highest through-movement potentials citywide and locally, respectively. This shows that the citywide NACH analysis highlights the main route network, whereas the most vital pedestrian-based main routes are highlighted in the local NACH analysis.  Regarding the analysis of small neighborhoods and public squares, the following concepts are used in the two-dimensional analytical approach.

•
Isovist map: An isovist map is the sum of isovist fields for a public space. The spatial boundary for each individual isovist field is given [58]. • All-lines analysis: This is an integration analysis of all possible sightlines. It is useful for the analysis of two-dimensional spaces such as large squares and large open public spaces that have weak spatial boundaries [41,62]. Figure 11 shows a visual graph analysis 11(a), a through-vision analysis 11(b), an all-lines analysis 11(c), and an agent-based model 11(d) of Rotterdam's modernistic squares 'De Doelen' and 'Schouwburgplein'. The largest through-vision is in the street that is perpendicular to the square, whereas the highest visual connectivity is inside the square (see the VGA analysis). Stationary activity of people tends to be highest at these two locations. Areas with the lowest visibility are frequented by only a few people. The all-lines axial map differs slightly from the results obtained from the visual graph and the throughvision analyses because it represents all the lines that are drawn to vertices that can see each other [62]. In the agent-based model, where agents are released from all locations in the simulation, agents gather mostly in the square itself. In contrast, releasing agents from a specific location in this simulation-in our case the theatre entrance/exit-demonstrates how agents orient themselves in the built environment one minute after leaving the theatre on foot (d1). We complete this section with some recently developed spatial concepts that are based on constituedness of streets from Hillier and Hanson [5]. The concepts below were developed from a research project on space and crime [47].
• Topological depth between private and public spaces: The number of semi-private or semi public spaces between private spaces inside buildings and public streets [47]. • Street intervisibility: A street with buildings that have both entrances and windows that are oriented towards the street on both sides of the street have high intervisibil We complete this section with some recently developed spatial concepts that are based on constituedness of streets from Hillier and Hanson [5]. The concepts below were developed from a research project on space and crime [47].
• Topological depth between private and public spaces: The number of semi-private or semipublic spaces between private spaces inside buildings and public streets [47]. • Street intervisibility: A street with buildings that have both entrances and windows that are oriented towards the street on both sides of the street have high intervisibility. Streets with buildings that only have windows on the ground floor but that lack entrances are not taken into account. Similarly, streets with buildings that have entrances and windows only on the ground floor on one side of the street lack intervisibility [47]. • Entrance density: This is the density of entrances and windows on the ground floor. Entrance density is often defined as low, medium, or high. Streets with buildings that only have entrances on the ground floor, but no windows are taken into account [47].

Primary Data Collection with Observation Techniques
Primary data collection for the analysis of socioeconomic factors allows testing of socio-spatial hypotheses and the development of models that predict spatial effects that influence socioeconomic life in cities. Throughout the years, three different methods for the collection of primary data concerning human behavior in the public realm were established as part of the space syntax analysis. Academic literature on these approaches is limited.

•
Pedestrian, bicycle, and car movement-'gate counts': Counting the flow of human movement at certain locations in a neighborhood over the course of a day provides quantitative data that can be used for comparison with various spatial integration values [4,40,48]. This method has been applied to provide evidence that central streets have high rates of human movement, while spatially segregated streets have low numbers of people frequenting them [15,16]. The gate count method is an observation technique that records pedestrian, bicycle, and vehicular movement flow in an urban area. A gate is an imaginary line across the street where all passing pedestrians, cyclists and motorized vehicles are counted. • Pedestrian route traces-'snail trailing': With this pedestrian-following technique, quantitative data are collected by observing pedestrian movement that disperses from specific, strategic locations [4,40,48]. It allows the investigation of the pattern of movement from a specific location, the relationship of a particular route to other routes in the area and the average distance that people walk from that specific location, all of which can help to determine the pedestrian catchment area of a retail facility or a public square. Superimposing all observations (traces) provides an image of pedestrian movement throughout an area under investigation. This technique can be performed manually or by using global positioning system (GPS) tracking. • Stationary activities-'static snapshots': This is an effective observation technique for the registration of people's various stationary activities including social interactions in public squares and parks [3] (p. 248). Human behavior in a public space is registered for a very short period of time-a 'snapshot' so to speak. This method records the usage pattern of a public space for a specific time and by repeating the registration throughout a day, a behavioral pattern can be identified over the course of a day.
The results from the gate counts and snail trailing correlate well with numerical results from axial and segment analyses. Static snapshots correlate well with results from all types of space syntax analyses but most strongly with visual graph analysis and all-lines analysis.

Theoretical Foundation: Space and Functions of Cities
Through refining concepts, calculation methods, and empirical evidence, as well as through verification of the methodological interventions throughout the years, some generalizations were formulated and these contributed to the development of a theory on the relationship between space and society [4].
In his book 'Space is the machine', Hillier presented the theory of spatial combinatorics [3] (Chapter 8). Together with his colleagues, Hillier developed the theory of natural movement [11,15,16], also named the theory of the natural movement economic process [3]. Based on the latter, van Nes and Ye developed the theory of natural urban transformation [63]. The theory of natural movement influenced the understanding of the dual network logic, leading to the definition of foreground and background networks of cities. The theory of spatial combinatorics contributed to Hillier's understanding of pervasive centrality, which states that in proximity to smaller centers there is always a much larger one. In the following sections, we will explain all three theories and their accompanying effects on the dual network and pervasive centrality.

The Theory of Spatial Combinatorics
This theory is based on the elementary principles of centrality, extension, contiguity and compactness. Since these spatial principles deal with the spatial aspects of the built environment, human intention, meaning or memories are not considered. The way in which public spaces are blocked or the way in which main routes are free from physical obstacles influences how city centers emerge or gradually decline [3] (p. 8).
Applying the principle of centrality, it can be demonstrated that the more central an object is placed within a defined space, the more it contributes to the overall segregation of this particular space. To illustrate this phenomenon, a building that is placed in the middle of a central square will add a higher overall segregation to the neighborhood than placing the same building at the edge of the square. In the latter case, the overall segregation of the neighborhood will be lower.
Furthermore, the principle of extension explains the partitioning of a long urban space, for example a long street. Blocking long main routes that connect a city's center to its outskirts contributes to the overall segregation of the city more than blocking short, local streets.
However, the size of the urban blocks matter. Short urban blocks contribute to higher spatial integration than large ones. That is the principle of contiguity.
The principle of compactness states that straight long buildings segregate more than 'curved' long buildings.
The theory of spatial combinatorics forms the foundation for the understanding of urban centralities that is based on the spatial layouts of built environments. As Hillier claims, urban centrality is not a state but a process that is based on spatial inequalities in an urban network [46]. Therefore, growth as a dynamic process of settlements entails a reorganization of spatial systems, including the hierarchy of centers and sub-centers or centrality and periphery. The cascade of different-sized centers as well as center and periphery represent the hierarchical scale of accessibility within a system [24].

The Theory of Natural Movement or the Natural Movement Economic Process
The theory of natural movement, often referred to as the natural movement economic process [11,15,19,21,22], states that the spatial configuration of the street network influences the flow of human movement and the location of shops in the built environment. There is a causal relationship between space, movement, and economic activities. The more spatially integrated a street is, the higher the flow of people movement and the more attractive the land along that street is for economic activities [15]. This process is influenced and changed through urban interventions such as new street links [19,64]. This theory explains how the built environment functions independently of planning processes with regard to socioeconomic activities. It is interesting to note that it is not movement and urban attractors that influence the street network's spatial configuration, but rather the street network's spatial configuration that is decisive for movement and for the optimum location for economic activities [11].

The Theory of the Natural Urban Transformation Process
Building upon the theory of natural movement, van Nes and Ye [63] developed the theory of the urban transformation process. This states that the spatial configuration of the street and the road network influences the degree of building density and the degree of functional diversity of land use. The higher the overall spatial centrality of streets on various scales, the higher the building densities and the greater the diversity of land use. Seemingly, the spatial configuration of the street network, as the foundation for steering urban transformation, influences the degree of functional diversity of land use over time. The theory of the natural urban transformation process explains how a built environment functions independently of planning processes with regard to restrictive land use plans, including the requirements for density and mixed land use. This theory contrasts with the post-modernist and new town planning practices that are common in North America, in some European countries and in Asia [4,22,63].

Understanding and Explaining the Dual Network
The theory of natural movement has contributed to some general understandings about how cities are spatially built up. According to Hillier, cities have a dual nature that consists of a foreground and a background street network. The foreground street network links urban centers at all scales and levels. These are the main routes that are identified by the normalized angular choice analysis with a high metric radius. It gives a city's street structure a 'deformed wheel pattern' that consists of radial and orbital main routes. This spatial structure can even be seen in cities that have a nearly orthogonal street network. These main routes are attractive for high levels of through-movement. The main route network that runs through and between neighborhoods shapes the deformed wheel's spokes. This makes access from the city's outskirts to its center and the natural interface of co-presence through movement efficient and possible. The foreground network is independent of cultures.
In a similar way, cities have a background network for residential areas, which is produced by and reflects cultural patterns. The background network is mostly shaped by the way in which different cultures influence urban space, including both the metric and the geometric properties of the network. However, local residential areas tend to also have a localized foreground structure [8] (p. 4).
However, we can see that all cities and towns are made up of a very large number of shorts streets and a very small number of long streets and roads [18]. This can be identified across scales and gives a city's street networks and regional networks a clear fractal structure [24,64,65]. Hillier explained that the foreground network is largely composed of longer streets and roads that connect to other streets and roads at highly obtuse angles. The longer the street line, the more likely it is to end with a nearly straight connection. Main routes through cities on all scales tend to consist of a set of longer lines that are connected to each other at almost 180-degree angles [7]. Conversely, the background network is largely made up of short streets that tend to intersect with other streets at nearly right angles. The shorter the street, the more likely it is to end at a right angle. Most residential streets tend to be metrically short [8].
The theory of the natural movement economic process is able to explain and predict the economic effects and flow of movement that are based on the spatial configuration of the foreground network. The constitution of urban centers works through spatial configuration of a street network. This affects land use and location choices. What can be identified by space syntax analysis is the 'attraction potential' (proximity, centrality and route choice) of different spatial areas as part of a city's self-organizing process [18]. Consequently, for each location in a city there is always a smaller and a much larger center nearby since overlapping neighborhoods are based on this proximity. Regarding the background network, the space syntax method can only be used to describe the spatial properties and help to understand the spatial features of various cultures [4].

Application: Space Syntax as a Tool in Analytical Urban Design
Over the last two decades, space syntax has gained popularity in the fields of architecture, urban planning, urban design, urban sociology, transport engineering, criminology, and archaeology. The space syntax toolbox provides techniques for the analysis, forecasting and postdiction of likely socioeconomic effects of the built environment.
To create a well-functioning built environment, we have to deal with space first and then with form. This means that planning and design of urban areas has to deal with the pathway network as the anchor of the city first [66]. In other words, it is highly important for the planning and design of a well-functioning space to acknowledge that the spatial structure is the determinant for functionality and therefore superior to form.
If the land use intensity is affected by the volume and the density of people in the streets, then space syntax assesses the effects on the future potentials of street life that are connected to land use. This means that for urban planning and design, space syntax is able to test the spatial effects of various urban design proposals and potentials of these. Thus, urban design proposals can be tested to give an indication of the potential degree of vital urban street life. Space syntax can support decision-making for well-functioning urban designs, allowing the creation of sustainable cities and communities. For testing and developing urban planning and urban design scenarios, it is appropriate to answer the 'what happens if . . . ?' question.
In the following example, we demonstrate the likely effects of two different locations for a new bridge across the Nieuwe Maas River in Rotterdam. This scenario testing was originally conducted in 2011 for the municipality of Rotterdam [67] to improve the spatial integration of the southern part of Rotterdam. The aim was to revitalize the southern part of Rotterdam since it lacked social integration and had a high number of low-income inhabitants. Figure 12 shows a space syntax analysis of two potential locations for a bridge. Option test A contributes to increasing the spatial integration of the southern centre of Rotterdam. In doing so, the centre will have the spatial potentials to become the main centre of Rotterdam. Option test B moves the main centre of Rotterdam towards the western part of Rotterdam south. Deriving conclusions from option testing in space syntax is rooted in the theory of the natural movement economic process and the theory of the natural urban transformation process.
In our next example, we tested two scenarios for De Doelen and the Schouwburgplein. We considered that the municipality of Rotterdam wanted to erect a WWII memorial wall in this square. The wall is 8 m long and 2 m high. To support our decision, we tested two potential locations and shapes for the wall. We applied Hillier's theory of spatial combinatorics to find out how the location and the shape of the wall would influence the spatial structure of the area. Figure 13a shows the analytical results of the wall's location and shape in a highly integrated area of the square. For this scenario, the wall has a linear shape and is blocking the maximum view of the square. Due to its prominent and highly visible location it will be seen immediately by all people entering the square. Figure 13b shows the analytical results of the memorial wall's location in a highly segregated area of the square. Furthermore, the wall is U-shaped. This shape hardly blocks any view across the square. The analytical results for this scenario confirm that De Doelen and the Shouwburgplein keep their high level of visibility and spatial integration. From a spatial perspective, a visitor has to make some effort to find the memorial wall when entering the square.
However, applying space syntax analysis to urban planning and design has some limitations. First of all, how space syntax is applied to a project depends on the problem under investigation. Not all types of problems can be analyzed. Space syntax measures spatial relationships and not place identity, which means that built form and meaning [68] cannot be interpreted using space syntax analysis. Secondly, space syntax is not always applied correctly. Common misapplication and fallacies include the application of incorrect radius/radii, incorrect resolution of the axial map, limited knowledge of the combination and correlation of space syntax with other types of analysis and data and the lack of knowledge of the context. These lead to misinterpretations of the space syntax results, which will have implications for urban planning and design guidelines.
Option test A contributes to increasing the spatial integration of the southern centre of Rotterdam. In doing so, the centre will have the spatial potentials to become the main centre of Rotterdam. Option test B moves the main centre of Rotterdam towards the western part of Rotterdam south. Deriving conclusions from option testing in space syntax is rooted in the theory of the natural movement economic process and the theory of the natural urban transformation process. In our next example, we tested two scenarios for De Doelen and the Schouwburgplein. We considered that the municipality of Rotterdam wanted to erect a WWII memorial wall in this square. The wall is 8 m long and 2 m high. To support our decision, we tested two potential locations and shapes for the wall. We applied Hillier's theory of spatial combinatorics to find out how the location and the shape of the wall would influence the spatial structure of the area. Figure 13a shows the analytical results of the wall's location and shape in a highly integrated area of the square. For this scenario, the wall has a linear shape and is blocking the maximum view of the square. Due to its prominent and highly visible location it will be seen immediately by all people entering the square. Figure 13b shows the analytical results of the memorial wall's location in a highly segregated area of the square. Furthermore, the wall is U-shaped. This shape hardly blocks any view across the square. The analytical results for this scenario confirm that De Doelen and the Shouwburgplein keep their high level of visibility and spatial integration. From a spatial perspective, a visitor has to make some effort to find the memorial wall when entering the square. However, applying space syntax analysis to urban planning and design has some limitations. First of all, how space syntax is applied to a project depends on the problem under investigation. Not all types of problems can be analyzed. Space syntax measures

Discussion: Advantages and Limitations of Space Syntax
David Seamon skillfully summarized the advantages of space syntax by underlining following five points [69] (p. 6): (1) space syntax provides a conclusively established connection between the conceptual argument and real-world confirmation (2) space syntax provides a highly effective connection between theory and practice, whereby the ideas can readily be translated into practical application that includes effective evaluation of specific building and urban designs in terms of pathway movements and potential interpersonal encounters (3) space syntax provides quantitative procedures that almost certainly arose from the world of environmental and architectural experience and, unlike so many other quantitative methods and models, actually depict the real-life world structure (4) space syntax is a creative translation of these quantitative measures into vivid graphic and cartographic presentations that allow non-specialists to easily and quickly see spatial and environmental patterns and linkages (5) perhaps most important, space syntax powerfully demonstrates that the central way the physical environment contributes to human life is through spatial patterns.
Despite its advantages, space syntax has its limitations and was criticized for the absence of 3D information and its failure to take into account attractors, such as public transportation hubs [52,70,71] as important factors in influencing the urban configuration and wayfinding. The argument was that the intelligibility of the built environment in Lynch's concept depends on 3D information. Suggestions for resolving these issues include a regression model [72]. Herein, Dalton et al. [73] proved that there was only a slight deviation between how people reported seeing specific content and places in real life (3D) and the results from a 2D visual graph analysis.
A further criticism of space syntax was that it does not take metric properties into account in the analysis of mobility networks [52] (p. 501). Indeed, space syntax originally only worked with topological distances (number of direction changes). Metric and geometric distances (degree or angular deviation) were added to the angular segment analysis after 2004. Joutsiniemi [74] highlighted that metric properties matter, especially on a local scale. At the 5th International Space Syntax Symposium, the introduction of the segment map, where segment length, angular deviation, and metric radii were added to the spatial calculations, managed to solve these shortcomings [7].
In addition, Batty [75] suggested a unifying framework of combining duals and primals, points and lines to overcome the limitations of the axial map and its representation as a planar graph. Batty stressed the fact that measuring the relative importance of the points, junctions, or intersections is equally important to measuring the streets as a node.

Conclusions: Space Syntax' Added Value to the Sustainable City Debate
The aim of this work was to provide a holistic explanation of the conceptual framework and the methodological and theoretical basis for studying the built environment through spatio-syntactical analysis. To achieve this, we first revisited Bill Hillier's fundamental contribution, both in scientific and didactic terms. We subsequently applied space syntax theories and concepts to the city of Rotterdam.
From these analyses, the following pressing question emerged: how can space syntax be used to describe the spatial features of sustainable urban areas? Some attempts at describing the physical features of urban sustainability were made during the late 1990s [76]. The compact city model and the compact decentralization approach [76,77] were proposals to counter urban sprawl with its high energy demand [64]. These proposals required an understanding of the link between urban compactness and sustainability. Most writings, however, lacked any suggestions on how spatial forces can generate sustainable urban processes. Space syntax allows spatial compactness, and therefore sustainable urban processes (i.e., pedestrian movement), to be understood through spatial configuration analysis. Space syntax analysis of urban compactness is possible since compactness depends on the urban environment's topological spatial character [78]. As an illustration of this, the case study of Rotterdam shows how the potential location of a new bridge ( Figure 12) may affect the existing centers and shift them spatially to different areas in the city, generating additional socioeconomic activities. In general, an urban street network that brings about movement and visibility, prompts urban restructuring and 'street grid intensification' over time. Pedestrian-friendly and cyclist-friendly cities have a relatively compact physical character. Street grid intensification is the process that leads to this compactness.
In contrast, urban sprawl is reinforced by a society that is dominated by motorized vehicles [79], which is the opposite of a compact pedestrian-friendly and cyclist-friendly city. Individual motorized transport in particular is creating high energy demands and is one of the basic environmental problems of modern cities, as stated in the 1987 Brundlandt report [80]. Car-dependence relates not only to a lack of available and efficient public transport, but also-mainly-to a dispersed and fragmented spatial street network. A city's spatial structure, and therefore its physical form and spatial configuration, influences the way in which people move-either on foot, by bicycle, by public transport or by car. It is also responsible for the location of economic functions (see Hillier's theory on the natural movement economic process in Section 3.2).
Furthermore, building density, mixed land use, and the mixture of activities primarily depend on the spatial structure of the street network. The relationship between building density and transportation is another key aspect for a sustainable city [81,82]. The higher the building density (which results in urban density), the greater the functional mix and the higher the per person energy savings for transport [1,83]. The lower all of the aforementioned factors are, the lower the overall compactness of the neighborhood and, consequently, the lower its walkability. This linear relationship results in high energy use and unsustainability of an area and vice versa.
Recent research [1,83] proved a correlation between the street network configuration and energy use for transport. Energy use for individual transport in neighborhoods with a potential for high local and citywide through-movement tends to be low. These kinds of spatial configurations enhance walking, cycling, and the use of public transport. Conversely, neighborhoods with low local and citywide or with high local and low citywide throughmovement potential enhance car dependency. Hence, criteria for successful pedestrianbased urban centers include a high density of the street network within a short metric distance and interconnectivity between local streets and main routes across the entire city. A city's spatial structure can support or hinder sustainable and active mobility. Interventions in the mobility network can affect the socioeconomic life in cities [4].
Although over the years some scholars demonstrated limitations in space syntax analysis, we advocate its strengths and advantages. Its strength is derived from the highly effective connection between theory and practice [84] at an architectural, urban, and regional scale. Therefore, it makes space syntax a robust tool that depicts the physical and the socioeconomic real-life world structure. In conclusion, space syntax offers, in a more practical way, powerful methods for the description of the spatial features of sustainable and unsustainable cities.