Prediction of Compressive Behavior of Laser-Powder-Bed Fusion-Processed TPMS Lattices by Regression Analysis

: Triply periodic minimal surface (TPMS) structures offer lightweight and high-stiffness solutions to different industrial applications. However, testing of these structures to calculate their mechanical properties is expensive. Therefore, it is important to predict the mechanical properties of these structures effectively. This study focuses on the effectiveness of using regression analysis and equations based on experimental results to predict the mechanical properties of diamond, gyroid, and primitive TPMS structures with different volume fractions and build orientations. Gyroid, diamond, and primitive specimens with three different volume fractions (0.2, 0.3, and 0.4) were manufactured using a laser powder bed fusion (LPBF) additive manufacturing process using three different build orientations (45 ◦ , 60 ◦ , and 90 ◦ ) in the present study. Experimental and statistical results revealed that regression analysis and related equations can be used to predict the mass, yield stress, elastic modulus, specific energy absorption, and onset of densification values of TPMS structures with an intermediate volume fraction value and specified build orientation with an error range less than 1.4%, 7.1%, 19.04%, 21.6%, and 13.4%, respectively.


Introduction
Triply periodic minimal surface (TPMS) lattice structures have recently attracted great attention due to their superior characteristics such as low weight, high energy absorption, and favorable thermal capabilities.These structures have zero mean curvatures and are modelled by mathematical equations [1].Diamond, gyroid, and primitive structures are three different types of TPMS structures mostly used in different industrial applications [2].Table 1 shows the mathematical equations used to generate these structures and Figure 1 shows the three-dimensional representation of diamond, gyroid, and primitive structures.
ers by the amount of one layer thickness and fresh powder is spread onto the previous layer.The process finishes when the whole part is fully melted, layer by layer [5].LPBF is a thermal process; therefore, support structures are needed, especially under overhanging surfaces, to prevent the part from distortion and dimensional deviation due to high thermal residual stresses [6].Since TPMS lattices have inclined and three-dimensionally connected surfaces, support structures are not needed during manufacturing of these structures in LPBF process since each layer will be supported by the previous layers [7].In most of the industrial applications where TPMS lattices are used, these structures undergo compressive loading.Under compressive loading, these structures show three different behaviors: (i) elastic behavior where structures undergo elastic deformation; (ii) plastic behavior where structures show constant or oscillating stress; and (iii) finally, densification behavior, above which a very high stress is needed to deform the structures, meaning that the structures behave like a solid structure.In the scientific literature, different studies focused on the behavior of different types of TPMS lattices under compressive loading.Zheng et al.'s study [8] presented that primitive structures showed higher strength and stiffness as compared to gyroid and diamond structures under compressive loading.A similar conclusion was also drawn by Maskery et al. [9].Yu et al. investigated the mechanical and energy absorption behaviors of functionally graded gyroid and primitive structures and stated that using grading enhanced the energy absorption characteristics of primitive structures but had little effect on gyroid structures [10].Novak et al. investigated the mechanical response of longitudinally and radially graded hybrid (containing both gyroid and diamond) structures experimentally and numerically, and proposed a computational model in LS-DYNA that had good agreement with the experimental results [11].Novak et al. tested 316L stainless-steel diamond, gyroid, primitive, and I-graph and wrapped package (IWP) structures produced by an LPBF process under compression loading.They reported that diamond and primitive lattices showed the highest and the lowest plateau stress and specific energy absorption, respectively [12].Sokullu et al.'s study compared different lattices produced using electron beam powder bed fusion and reported that the diamond lattices showed the highest plateau stress, whereas the primitive lattice showed the lowest.However, for specific energy absorption, gyroid lattices outperformed when compared with diamond and primitive lattices [13].Gülcan et al. stated that for different volume fractions, generally, diamond lattices showed higher yield stress and specific energy absorption than gyroid and primitive lattices produced by LPBF from CoCr material [14].Zhang et al.'s study revealed that LPBF-produced 316L TPMS lattice structures can be manufactured by conventional manufacturing methods; however, due to its need for molds, fixtures, or machining, the manufacturing of these structures with these methods is expensive.Thanks to the advancements in different additive manufacturing (AM) technologies, the manufacturing of these lattice structures is easier and less expensive today [4].The LPBF process is one of the metal AM processes where laser energy is used to melt the metal powders on a build plate based on computeraided-design geometry.After melting one metal powder layer, the machine platform lowers by the amount of one layer thickness and fresh powder is spread onto the previous layer.The process finishes when the whole part is fully melted, layer by layer [5].LPBF is a thermal process; therefore, support structures are needed, especially under overhanging surfaces, to prevent the part from distortion and dimensional deviation due to high thermal residual stresses [6].Since TPMS lattices have inclined and three-dimensionally connected surfaces, support structures are not needed during manufacturing of these structures in LPBF process since each layer will be supported by the previous layers [7].
In most of the industrial applications where TPMS lattices are used, these structures undergo compressive loading.Under compressive loading, these structures show three different behaviors: (i) elastic behavior where structures undergo elastic deformation; (ii) plastic behavior where structures show constant or oscillating stress; and (iii) finally, densification behavior, above which a very high stress is needed to deform the structures, meaning that the structures behave like a solid structure.In the scientific literature, different studies focused on the behavior of different types of TPMS lattices under compressive loading.Zheng et al.'s study [8] presented that primitive structures showed higher strength and stiffness as compared to gyroid and diamond structures under compressive loading.A similar conclusion was also drawn by Maskery et al. [9].Yu et al. investigated the mechanical and energy absorption behaviors of functionally graded gyroid and primitive structures and stated that using grading enhanced the energy absorption characteristics of primitive structures but had little effect on gyroid structures [10].Novak et al. investigated the mechanical response of longitudinally and radially graded hybrid (containing both gyroid and diamond) structures experimentally and numerically, and proposed a computational model in LS-DYNA that had good agreement with the experimental results [11].Novak et al. tested 316L stainless-steel diamond, gyroid, primitive, and I-graph and wrapped package (IWP) structures produced by an LPBF process under compression loading.They reported that diamond and primitive lattices showed the highest and the lowest plateau stress and specific energy absorption, respectively [12].Sokullu et al.'s study compared different lattices produced using electron beam powder bed fusion and reported that the diamond lattices showed the highest plateau stress, whereas the primitive lattice showed the lowest.However, for specific energy absorption, gyroid lattices outperformed when compared with diamond and primitive lattices [13].Gülcan et al. stated that for different volume fractions, generally, diamond lattices showed higher yield stress and specific energy absorption than gyroid and primitive lattices produced by LPBF from CoCr material [14].Zhang et al.'s study revealed that LPBF-produced 316L stainless-steel diamond lattices showed more favorable mechanical properties than gyroid and primitive lattices [15].Al Mahri et al.'s study on LPBF-produced 316L stainless-steel TPMS lattices showed similar results; diamond and primitive lattices showed the highest and lowest energy absorption, respectively [16].Naghavi et al. stated that LPBF-produced Ti6Al4V diamond lattices showed nearly a 65% higher stiffness and nearly a 48% greater strength than gyroid structures at the same pore size [17].Teng et al.'s experimental study on LPBF-produced 316L stainless-steel TPMS structures revealed that gyroid lattices had a higher energy absorption, plateau stress, yield stress, elastic modulus than primitive structures [18].
Although TPMS structures offer lightweight and high-stiffness solutions to different industrial applications, the testing of these structures is expensive.Therefore, modelling and simulation of these structures to understand the mechanical properties is essential.However, since TPMS structures have very complex features, the modelling of these structures requires time-consuming computational efforts [19].For this reason, alternative approaches to effectively predict the compressive behavior of TPMS structures seems to be an urgent issue.
This study focused on predicting the compressive behavior of TPMS structures using regression analysis.Gyroid, diamond, and primitive specimens with three different volume fractions (0.2, 0.3, and 0.4) were manufactured using the LPBF process using three different build orientations (45 • , 60 • , and 90 • ) in the present study.Apart from the TPMS type, volume fraction and build orientation were also selected as design variables since they play an important role in the compressive behavior of TPMS lattice structures produced by the LPBF process [20].Statistical evaluations based on regression analysis were compared with the test results for TPMS lattices with a 0.35 volume fraction and 90 • build orientation angle.
The structure of the remainder of this paper is as follows: Section 2 explains the materials and methods used in the study.In Section 3, the results from the manufacturing, compression testing, regression analysis, and validation analysis based on an intermediate volume fraction are given.The related test result discussions are also included in Section 3. The paper is concluded in Section 4 by giving the main findings.

TPMS Lattice Structure Design
Gyroid, diamond, and primitive specimens with an 8 mm unit cell size and 32 × 32 × 32 mm outer dimensions were modelled using MSLattice software v1.0 developed by Oraib Al-Ketan et al. [21].Three different volume fractions (0.2, 0.3, and 0.4) and three different build orientations (45 • , 60 • , and 90 • ) were used.Volume fractions were selected to be less than 0.5, since above that value, the specimens became nearly solid structures.Under each TPMS structure, line supports, where the interaction between the support structure and the part is along a line, with related build orientation angles were used.The geometries were obtained using the design of experiments method.Among different design of experiments methods in the literature, the Taguchi design of experiments method was used to reduce the number of experiments.In the Taguchi method, different orthogonal arrays representing a different number of specimens with different design variables can be used.Since there were three design variables (TPMS type, volume fraction, and build orientation) with three levels in the present study, an L 9 Taguchi orthogonal array was implemented.In this array, there are 9 specimens with design variables as shown in Table 2.

Additive Manufacturing of the TPMS Lattice Structures
A spherical CoCrMo powder (GE Additive, Mölnlycke, Sweden) with a 10-45 µm particle size (<10 µm: max.5% < 45 µm: min.95%) produced by the gas atomization technique was used in manufacturing.A Concept Laser M2 LPBF machine (Concept Laser GmbH, Lichtenfels, Germany) was used to manufacture the specimens.Before manufacturing, the build plate was heated to 70 • C.During the process, layer thickness, laser power, scanning speed, and hatch spacing values were set to 50 µm, 180 W, 1500 mm/s and 60 µm, respectively.For each of the 9 different specimens, two repetitions, hence a total of 18 specimens, were manufactured and tested, and average values of the results were used in the experiments.
Manufactured specimens with the build plate were removed from the LPBF machine and placed in a Solukon SFM-AT800 machine (Solukon Maschinenbau GmbH, Augsburg, Germany) to remove the excess powder inside the TPMS structures.After the powder removal process, the TPMS structures were removed from the build plate using a wire electrical discharge machine (Agie Charmilles Ltd., Biel, Switzerland).Then, line supports were removed from the TPMS structures manually.A Zeiss Merlin FE-SEM scanning electron microscope (Carl Zeiss AG, Jena, Germany) was used for metallographic studies.

Compression Test
The Instron 5985 universal testing machine (Instron Inc., Norwood, MA, USA) was used for compression tests with a crosshead displacement of 0.5 mm/min.A 100 kN load cell was utilized during the tests.The test results were in the form of load-displacement curves.Using a 1024 mm 2 (32 mm × 32 mm) cross-sectional area of the specimens, these curves were converted into stress-strain curves.Yield stress, elastic modulus, energy absorption (the area under the load-displacement curve up to densification strain), and the onset of densification of different TPMS types with different volume fractions and build orientations were calculated based on these curves using Matlab software (R2019b, MathWorks, Natick, MA, USA).A Sartorius GC 1603 SOCE model weight-measuring device was used to measure the weight of each specimen.These weight results were then used to calculate the specific energy absorption values.
Experimental results were imported into Minitab software (19.2020.1,Minitab Inc., State College, PA, USA) and regression analyses were performed.Obtained regression equations were then used to predict the mass, yield stress, elastic modulus, specific energy absorption, and the onset of densification of TPMS structures with intermediate volume fractions.As a validation study, gyroid, diamond, and primitive specimens with a 90 • build orientation and 0.35 volume fraction were produced and tested.Two repetitions for each of the specimens and a total of six specimens were manufactured for the validation study.Then, predicted results based on regression equations were compared with the experimental results of these specimens.

Compression and Energy Absorption Indicators
Some key performance indicators for lattice structures are required to evaluate the compression results.In general, the specific energy absorption capacity (SEA) is used to underline the energy absorption capacity of lattice structures of a unit weight in order to define their usefulness in weight-bearing applications.For this reason, first, the total energy absorption value (EA) is calculated by multiplying the outbox volume (V) of the lattice structure with the area under the stress-stain curve to the onset of the densification strain (ε d ), as seen in Equation (1).
Then, the SEA value is calculated based on the absorbed energy per mass (m) using Equation (2).
In order to define the onset of densification, determine the optimal energy absorption of the lattice structure, and provide a numerical method for better comparison of the SEA of different lattice structures, an energy efficiency parameter is calculated based on the stress-strain curve (Figure 2a) and is defined by Equation (3).
A representative strain value showing the onset of densification is calculated using Equation ( 4), which demonstrates the maximum point of the efficiency-strain curve of the lattice structure (Figure 2b) [22,23].
Then, the SEA value is calculated based on the absorbed energy per mass (m) using Equation (2).

SEA =
(2) In order to define the onset of densification, determine the optimal energy absorption of the lattice structure, and provide a numerical method for better comparison of the SEA of different lattice structures, an energy efficiency parameter is calculated based on the stress-strain curve (Figure 2a) and is defined by Equation (3).
A representative strain value showing the onset of densification is calculated using Equation ( 4), which demonstrates the maximum point of the efficiency-strain curve of the lattice structure (Figure 2b) [22,23].

Manufacturing and Inspection Results
All of the 24 manufactured specimens on the build plate are shown in Figure 3. TPMS structures and line supports were successfully built without any observed failures with the exception of one validation study specimen.

Manufacturing and Inspection Results
All of the 24 manufactured specimens on the build plate are shown in Figure 3. TPMS structures and line supports were successfully built without any observed failures with the exception of one validation study specimen.

Compression Test Results
Quasi-static compression test results are shown in Figures 4-6 for diamond, gyroid, and primitive structures, respectively, and the efficiency-strain plots are shown in Figure 7.In the efficiency-strain plots, two different types of onset of densification points are observed in contrast to the typical efficiency-strain plot as shown in Figure 2b.As is seen in Figure 2b, the maximum point on the efficiency-strain curve is selected where the general curve behavior is also changing.In Figure 7, there is a maximum point called the first onset of densification point, caused by the instant fracture of a large part in the TMPS structures.However, there is no change in the general curve behavior.Even though it has the maximum value, it cannot be used as the onset of the densification point.Thus, another point should be sought after.At the point between the 0.5 and 0.6 mm/mm strain range, it is neither the maximum point nor the point at which the curve behavior is changing.Therefore, there is no need to skip the value between 0.7 and 0.8, and searching for another point is not necessary.Additionally, the onset of the densification point indicates the point at which the structure behaves as a bulky structure, and a steep stress increase in this region is expected.Also, the onset of the densification point obtained from the numerical calculation can be validated by monitoring the stress-strain curve.Based on these graphs, yield stress, elastic modulus, specific energy absorption values, and the onset of densification points are shown in Table 3.

Compression Test Results
Quasi-static compression test results are shown in Figures 4-6 for diamond, gyroid, and primitive structures, respectively, and the efficiency-strain plots are shown in Figure 7.In the efficiency-strain plots, two different types of onset of densification points are observed in contrast to the typical efficiency-strain plot as shown in Figure 2b.As is seen in Figure 2b, the maximum point on the efficiency-strain curve is selected where the general curve behavior is also changing.In Figure 7, there is a maximum point called the first onset of densification point, caused by the instant fracture of a large part in the TMPS structures.However, there is no change in the general curve behavior.Even though it has the maximum value, it cannot be used as the onset of the densification point.Thus, another point should be sought after.At the point between the 0.5 and 0.6 mm/mm strain range, it is neither the maximum point nor the point at which the curve behavior is changing.Therefore, there is no need to skip the value between 0.7 and 0.8, and searching for another point is not necessary.Additionally, the onset of the densification point indicates the point at which the structure behaves as a bulky structure, and a steep stress increase in this region is expected.Also, the onset of the densification point obtained from the numerical calculation can be validated by monitoring the stress-strain curve.Based on these graphs, yield stress, elastic modulus, specific energy absorption values, and the onset of densification points are shown in Table 3.              Elastic, plateau, and densification regimes are clearly visible for diamond, gyroid, and primitive specimens in Figures 4-6.The stress in the elastic regime increased with an increase in strain for all TPMS types and reached its first maximum value [24].At the onset of the plateau regime, the stress suddenly dropped due to the shear band failure [25].For diamond specimens, the plateau regime starts at a strain of nearly 0.18−0.20,whereas for gyroid and primitive specimens, it starts at nearly 0.20−0.23 and 0.15−0.17,respectively.Gyroid and diamond specimens showed nearly stable stress values, and no sudden stress drops were observed in the plateau regime.On the other hand, distinct stress drops or fluctuations were observed in the plateau regime of primitive specimens corresponding to four unit cells [26].For all specimens, the densification regime starts at strains of nearly 0.7−0.8.Since TPMS lattices consist of continuous walls, during compressive loading, these walls squeeze and crash, which results in a sudden decrease in stress at the onset of plateau regime.At the plateau regime, the squeezing and crashing of successive layers results in similar behavior that causes oscillating stress at the plateau regime [27].This oscillating stress behavior at the plateau regime is clearly visible for diamond, gyroid, and primitive specimens in Figures 4-6.It is also clear that for the same TPMS type, an increase in the volume fraction resulted in an increase in yield stress and elastic modulus, in addition to the number of fluctuations in the plateau regime due to the higher stiffness at higher volume fractions [16].
From Table 3, it can be concluded that diamond specimens outperformed in terms of yield stress and specific energy absorption when compared with gyroid and primitive specimens.The highest and the lowest yield stresses and specific energy absorptions were observed for diamond specimens with a 0.4 volume fraction and 90 • build orientation, and for primitive specimens with a 0.2 volume fraction and 90 • build orientation.In terms of the elastic modulus, the highest and the lowest values were observed for primitive specimens with a 0.4 volume fraction and 45 • build orientation, and for primitive specimens with 0.2 volume fraction and 90 • build orientation.These experimental results are consistent with the literature [12,13,15].However, no direct correlation was found between TPMS type and elastic modulus for the same volume fractions.
Table 4 shows the video images of gyroid, diamond and primitive lattices captured with a 0.2 mm/mm strain interval.It is clear from the images that specimens showed an elastic-brittle failure mechanism [28].In the elastic regime up to a ~0.2 mm/mm strain, all TPMS lattices showed uniform deformation.However, in the plateau regime where the strain is between ~0.2 mm/mm and ~0.7-0.8 mm/mm, primitive specimens showed progressive collapse of the layers starting from the bottom unit cell.Above a ~0.7 mm/mm strain, all layers of the primitive specimen were collapsed, and the specimen behaved like a solid bulk material [29].On the other hand, gyroid and diamond specimens showed shear band failure in the oblique directions [13].TPMS lattices showed uniform deformation.However, in the plateau regime where the strain is between ~0.2 mm/mm and ~0.7-0.8 mm/mm, primitive specimens showed progressive collapse of the layers starting from the bottom unit cell.Above a ~0.7 mm/mm strain, all layers of the primitive specimen were collapsed, and the specimen behaved like a solid bulk material [29].On the other hand, gyroid and diamond specimens showed shear band failure in the oblique directions [13].TPMS lattices showed uniform deformation.However, in the plateau regime where the strain is between ~0.2 mm/mm and ~0.7-0.8 mm/mm, primitive specimens showed progressive collapse of the layers starting from the bottom unit cell.Above a ~0.7 mm/mm strain, all layers of the primitive specimen were collapsed, and the specimen behaved like a solid bulk material [29].On the other hand, gyroid and diamond specimens showed shear band failure in the oblique directions [13].TPMS lattices showed uniform deformation.However, in the plateau regime where the strain is between ~0.2 mm/mm and ~0.7-0.8 mm/mm, primitive specimens showed progressive collapse of the layers starting from the bottom unit cell.Above a ~0.7 mm/mm strain, all layers of the primitive specimen were collapsed, and the specimen behaved like a solid bulk material [29].On the other hand, gyroid and diamond specimens showed shear band failure in the oblique directions [13].strain is between ~0.2 mm/mm and ~0.7-0.8 mm/mm, primitive specimens showed progressive collapse of the layers starting from the bottom unit cell.Above a ~0.7 mm/mm strain, all layers of the primitive specimen were collapsed, and the specimen behaved like a solid bulk material [29].On the other hand, gyroid and diamond specimens showed shear band failure in the oblique directions [13].strain is between ~0.2 mm/mm and ~0.7-0.8 mm/mm, primitive specimens showed progressive collapse of the layers starting from the bottom unit cell.Above a ~0.7 mm/mm strain, all layers of the primitive specimen were collapsed, and the specimen behaved like a solid bulk material [29].On the other hand, gyroid and diamond specimens showed shear band failure in the oblique directions [13].strain is between ~0.2 mm/mm and ~0.7-0.8 mm/mm, primitive specimens showed progressive collapse of the layers starting from the bottom unit cell.Above a ~0.7 mm/mm strain, all layers of the primitive specimen were collapsed, and the specimen behaved like a solid bulk material [29].On the other hand, gyroid and diamond specimens showed shear band failure in the oblique directions [13].gressive collapse of the layers starting from the bottom unit cell.Above a ~0.7 mm/mm strain, all layers of the primitive specimen were collapsed, and the specimen behaved like a solid bulk material [29].On the other hand, gyroid and diamond specimens showed shear band failure in the oblique directions [13].gressive collapse of the layers starting from the bottom unit cell.Above a ~0.7 mm/mm strain, all layers of the primitive specimen were collapsed, and the specimen behaved like a solid bulk material [29].On the other hand, gyroid and diamond specimens showed shear band failure in the oblique directions [13].gressive collapse of the layers starting from the bottom unit cell.Above a ~0.7 mm/mm strain, all layers of the primitive specimen were collapsed, and the specimen behaved like a solid bulk material [29].On the other hand, gyroid and diamond specimens showed shear band failure in the oblique directions [13].strain, all layers of the primitive specimen were collapsed, and the specimen behaved like a solid bulk material [29].On the other hand, gyroid and diamond specimens showed shear band failure in the oblique directions [13].strain, all layers of the primitive specimen were collapsed, and the specimen behaved like a solid bulk material [29].On the other hand, gyroid and diamond specimens showed shear band failure in the oblique directions [13].strain, all layers of the primitive specimen were collapsed, and the specimen behaved like a solid bulk material [29].On the other hand, gyroid and diamond specimens showed shear band failure in the oblique directions [13].0.8

Regression Analysis Results
Regression equations based on the test results for different TPMS lattices are shown in Table 5 in terms of mass, yield stress, elastic modulus, specific energy absorption, and the onset of densification.0.8

Regression Analysis Results
Regression equations based on the test results for different TPMS lattices are shown in Table 5 in terms of mass, yield stress, elastic modulus, specific energy absorption, and the onset of densification.0.8

Regression Analysis Results
Regression equations based on the test results for different TPMS lattices are shown in Table 5 in terms of mass, yield stress, elastic modulus, specific energy absorption, and the onset of densification.

Regression Analysis Results
Regression equations based on the test results for different TPMS lattices are shown in Table 5 in terms of mass, yield stress, elastic modulus, specific energy absorption, and the onset of densification.

Validation Study Results
Quasi-static compression test results for three different TPMS types with a 0.35 volume fraction and 90 • build orientation are shown in 8. Based on this graph, yield stress, elastic modulus, specific energy absorption, and the onset of densification values were calculated.Table 6 shows the predicted results from the regression equations and calculated results based on the test values.

Validation Study Results
Quasi-static compression test results for three different TPMS types with a 0.35 vo ume fraction and 90° build orientation are shown in Figure 8.Based on this graph, yiel stress, elastic modulus, specific energy absorption, and the onset of densification value were calculated.Table 6 shows the predicted results from the regression equations an calculated results based on the test values.From Table 6, it can be concluded that there is less than a 1.4% error in the prediction of the mass value of a TPMS structure with an intermediate volume fraction value and specified build orientation.The predicted and tested yield stress values also demonstrate good consistency with an error value less than 7.1%.The error range between predicted and tested values in terms of the elastic modulus and specific energy absorption was below 21.6%.The max. error values for the elastic modulus and specific energy absorption were found to be 19.04% for the diamond specimen and 21.6% for the primitive specimen, respectively.These large differences can be attributed to the dimensional deviations of TPMS walls from the original geometry.During the LPBF process, melt pools at the TPMS walls try to sag towards the powder bed underneath, since there are no support structures at these locations.This affects the geometrical differences between the produced geometry and original geometry, which results in different mechanical properties from those expected [30].This phenomenon is obvious from the SEM images in Figures 9 and 10.Non-fully melted particle adhesion to the overhanging gyroid ligaments and dimensional deviation were observed (red arrows), which resulted in different mechanical properties between the predicted and test results.In terms of the onset of densification, there was a very good correlation between the predicted and tested values for the diamond specimen and the max.error was observed in the primitive specimen with an error range of 13.4%.at these locations.This affects the geometrical differences between the produced geometry and original geometry, which results in different mechanical properties from those expected [30].This phenomenon is obvious from the SEM images in Figures 9 and 10.Nonfully melted particle adhesion to the overhanging gyroid ligaments and dimensional deviation were observed (red arrows), which resulted in different mechanical properties between the predicted and test results.In terms of the onset of densification, there was a very good correlation between the predicted and tested values for the diamond specimen and the max.error was observed in the primitive specimen with an error range of 13.4%.at these locations.This affects the geometrical differences between the produced geometry and original geometry, which results in different mechanical properties from those expected [30].This phenomenon is obvious from the SEM images in Figures 9 and 10.Nonfully melted particle adhesion to the overhanging gyroid ligaments and dimensional deviation were observed (red arrows), which resulted in different mechanical properties between the predicted and test results.In terms of the onset of densification, there was a very good correlation between the predicted and tested values for the diamond specimen and the max.error was observed in the primitive specimen with an error range of 13.4%.

Conclusions
This study investigated the effectiveness of regression analysis in predicting the mechanical properties of different types of TPMS lattices.Experimental and statistical findings can be summarized as follows: • All specimens (gyroid, diamond, and primitive) showed similar compressive behaviors.There was a rapid decrease in stress at the onset of yielding and stress fluctuated at the plateau regime.These fluctuations increased at higher volume fraction values.

•
Diamond specimens outperformed in terms of yield stress and specific energy absorption when compared with gyroid and primitive specimens.This makes diamond structures good candidates for applications where higher strains are needed before plastic deformations [9].

•
Regression analysis and related equations can be used for predicting mass, yield stress, elastic modulus, specific energy absorption, and the onset of densification values of TPMS specimens with intermediate volume fraction values.The present study showed that mass, yield stress, elastic modulus, specific energy absorption, and the onset of densification of TPMS lattices can be predicted with an error value less than 1.4%, 7.1%, 19.04%, 21.6%, and 13.4%, respectively.
In this study, quasi-static compression tests were performed on different types of TPMS lattices with different volume fractions and build orientations.Future studies will focus on the dynamic behavior of these types of lattices, both experimentally and numerically.Moreover, for the validation study, an intermediate volume fraction value (0.35) was selected for three types of TPMS lattices.To carry out further assessments, different TPMS lattices with intermediate build orientation values will be manufactured, tested, and compared with the predicted values.

Figure 4 .
Figure 4. Compression test results for diamond specimens.BO and VF stand for build orientation and volume fraction, respectively.

Figure 4 .
Figure 4. Compression test results for diamond specimens.BO and VF stand for build orientation and volume fraction, respectively.

Figure 4 .
Figure 4. Compression test results for diamond specimens.BO and VF stand for build orientation and volume fraction, respectively.

Figure 5 .
Figure 5. Compression test results for gyroid specimens.BO and VF stand for build orientation and volume fraction, respectively.

Figure 6 .
Figure 6.Compression test results for primitive specimens.BO and VF stand for build orientation and volume fraction, respectively.

Figure 5 .
Figure 5. Compression test results for gyroid specimens.BO and VF stand for build orientation and volume fraction, respectively.

Figure 4 .
Figure 4. Compression test results for diamond specimens.BO and VF stand for build orientation and volume fraction, respectively.

Figure 5 .
Figure 5. Compression test results for gyroid specimens.BO and VF stand for build orientation and volume fraction, respectively.

Figure 6 .
Figure 6.Compression test results for primitive specimens.BO and VF stand for build orientation and volume fraction, respectively.

Figure 6 . 14 Figure 7 .
Figure 6.Compression test results for primitive specimens.BO and VF stand for build orientation and volume fraction, respectively.J. Manuf.Mater.Process.2024, 8, x FOR PEER REVIEW 8 of 14

Figure 7 .
Figure 7. Efficiency-strain plot for the determination of onset of densification point for specimen 8 (gyroid with 0.4 volume fraction and 60 • build orientation).

Figure 8 .
Figure 8. Stress-strain graph for three different TPMS types with 0.35 volume fraction and 90° bui orientation.

Figure 9 .
Figure 9. SEM image of gyroid TPMS lattice structure: (a) cross-sectional view; (b) lateral view.Red arrows show non-fully melted particle adhesion to the overhanging surfaces.

Figure 9 .
Figure 9. SEM image of gyroid TPMS lattice structure: (a) cross-sectional view; (b) lateral view.Red arrows show non-fully melted particle adhesion to the overhanging surfaces.

Figure 9 .
Figure 9. SEM image of gyroid TPMS lattice structure: (a) cross-sectional view; (b) lateral view.Red arrows show non-fully melted particle adhesion to the overhanging surfaces.

Figure 10 .
Figure 10.SEM image of gyroid TPMS lattice structure overhanging ligaments.Red arrows show non-fully melted particle adhesion to the overhanging surfaces.

Table 2 .
L 9 Taguchi orthogonal array with design variables.

Table 3 .
Mechanical properties of specimens with standard deviations.

Table 3 .
Mechanical properties of specimens with standard deviations.

Table 4 .
Loading sequence of gyroid, diamond, primitive TPMS structures with a 0.2 mm/mm strain interval.

Table 4 .
Loading sequence of gyroid, diamond, primitive TPMS structures with a 0.2 mm/mm strain interval.

Table 4 .
Loading sequence of gyroid, diamond, primitive TPMS structures with a 0.2 mm/mm strain interval.

Table 4 .
Loading sequence of gyroid, diamond, primitive TPMS structures with a 0.2 mm/mm strain interval.

Table 4 .
Loading sequence of gyroid, diamond, primitive TPMS structures with a 0.2 mm/mm strain interval.

Table 4 .
Loading sequence of gyroid, diamond, primitive TPMS structures with a 0.2 mm/mm strain interval.

Table 4 .
Loading sequence of gyroid, diamond, primitive TPMS structures with a 0.2 mm/mm strain interval.

Table 4 .
Loading sequence of gyroid, diamond, primitive TPMS structures with a 0.2 mm/mm strain interval.

Table 4 .
Loading sequence of gyroid, diamond, primitive TPMS structures with a 0.2 mm/mm strain interval.

Table 4 .
Loading sequence of gyroid, diamond, primitive TPMS structures with a 0.2 mm/mm strain interval.

Table 4 .
Loading sequence of gyroid, diamond, primitive TPMS structures with a 0.2 mm/mm strain interval.

Table 4 .
Loading sequence of gyroid, diamond, primitive TPMS structures with a 0.2 mm/mm strain interval.

Table 4 .
Loading sequence of gyroid, diamond, primitive TPMS structures with a 0.2 mm/mm strain interval.

Table 5 .
Regression equations.VF stands for volume fraction and is valid for 0.2-0.4range.

Table 5 .
Regression equations.VF stands for volume fraction and is valid for 0.2-0.4range.

Table 5 .
Regression equations.VF stands for volume fraction and is valid for 0.2-0.4range.

Table 5 .
Regression equations.VF stands for volume fraction and is valid for 0.2-0.4range.

Table 6 .
Predicted and tested results.
Figure 8. Stress-strain graph for three different TPMS types with 0.35 volume fraction and 90 • build orientation.

Table 6 .
Predicted and tested results.