Blog

ANFIS-based forming limit prediction of stainless steel 316 sheet metals | Scientific Reports

Thank you for visiting nature.com. You are using a browser version with limited support for CSS. To obtain the best experience, we recommend you use a more up to date browser (or turn off compatibility mode in Internet Explorer). In the meantime, to ensure continued support, we are displaying the site without styles and JavaScript.

Scientific Reports volume  13, Article number: 3115 (2023 ) Cite this article Stainless Steel Rod Bar

ANFIS-based forming limit prediction of stainless steel 316 sheet metals | Scientific Reports

Effect of microstructure on the formability of the stainless sheet metals is a major concern for engineers in sheet industries. In the case of austenitic steels, existence of strain-induced martensite (\({\alpha }^{^{\prime}}\) -martensite) in their micro structure causes considerable hardening and formability reduction. In the present study, we aim to evaluate the formability of AISI 316 steels with different intensities of martensite via experimental and artificial intelligence methods. In the first step, AISI 316 grade steels with 2 mm initial thicknesses are annealed and cold rolled to various thicknesses. Subsequently, the relative area of strain-induced martensite are measured using metallography tests. Formability of the rolled sheets are determined using hemisphere punch test to obtain forming limit diagrams (FLDs). The data obtained from experiments were further utilized to train and validate an artificial neural fuzzy interfere system (ANFIS). After training the ANFIS, predicted major strains by the neural network are compared to a new set experimental results. The results indicate that cold rolling has unfavorable effects on the formability of this type of stainless steels while significantly strengthens the sheets. Moreover, the ANFIS exhibits satisfactory results in comparison to the experimental measurements.

Yichen Xie, Yuping Wu, … Mohamed Amine Khadimallah

Jin-Woong Lee, Chaewon Park, … Kee-Sun Sohn

Mehmet Altuğ & Hasan Söyler

The formability of sheet metals although has been the subject of research articles for decades, is yet an interesting field of study in metallurgy. The new technological instruments and computational models make it easier to find about the underlying factors affecting formability. Most importantly, using crystal plasticity finite element methods (CPFEM) in recent years reveals the significance of microstructure on the forming limits. On the other hand, availability of scanning electron microscope (SEM) and Electron Backscatter Diffraction (EBSD) have aided researchers to observe microstructural activities of the crystalline structures during deformation. Understanding of effects of different phases in metals, grain size and orientation and micro-scale imperfection in the grain level are vital in prediction of formability.

Formability determination itself is challenging procedure since it has been proven that formability is highly path-dependent1,2,3. Therefore, conventional forming limit strains representation could not be reliable in non-proportional loading conditions. On the other hand, the majority of loadings paths in industrial application is categorized as non-proportional. In this regard, conventional hemi-sphere and Marciniak–Kuczynski (M–K) experimental methods should be utilized with caution4,5,6. In recent years, another concept of fracture forming limit diagram (FFLD) has attracted the attention of many engineers in the field of formability. In this concept, the formability of the sheets is predicted using the damage models. In this regard, path independency is intrinsically incorporated in the analyses and the results are in good agreement with non-proportional experimental results7,8,9. Formability in sheet metals has dependency on several parameters and processing history of the sheets and also on the microstructure and phases in metals10,11,12,13,14,15.

Size-dependency is a challenge in incorporation of micro-features on metals. In small-deformation space, the dependency of the vibration and buckling characteristics has proven to be strongly dependent on the length scale of the materials16,17,18,19,20,21,22,23,24,25,26,27,28,29,30. Effects of grain size on the formability have been recognized in industry for a long time. Effects of grain size and thickness on the stretchability of sheet metals were examined using theoretical analysis by Yamaguchi and Mellor31. Using Marciniak model, they reported that decrease in the thickness to grain size ratio causes decrease in stretchability of sheets in biaxial stretch loading condition. Experimental results by Wilson et al.32 confirm that reduction in the thickness to average grain diameter (t/d) leads to decrease in biaxial stretchability of three different sheet metals with various thicknesses. They concluded that for t/d values less than 20, the prominent strain inhomogeneity and necking are mostly affected by individual grains in the thickness of the sheet. Effect of grain size austenitic stainless steels 304 and 316 on the bulk workability was investigated by Ulvan and Koursaris33. They reported that the formability of these metals were not affected by grain size but slight variation in the tensile characteristics were seen. In specific, increase in grain size resulted in decrease the strength measures of these steels. Examination of the effect of dislocation density on the flow stress of nickel metal reveals that irrespective of grain size, it is the dislocation density that determines the flow stress of the metal34. Grain interaction and initial orientations also have significant influence on the texture evolution in aluminum as examined by (Becker and Panchanadeeswaran using experimental and crystal plasticity simulations35. The numerical results in their analyses were in good harmony with experiments although due to limitations in applying boundary condition some simulation results deviated from experiments. Rolled aluminum sheets manifested different formabilities as detected crystal plasticity simulations and experimental examination36. It was shown that although the stress–strain curves of different sheets were almost similar, there were a significant differences in their formability based on the initial textures. Amelirad and Assempour utilized experimental and CPFEM to obtain forming limit curves in austenitic stainless steel sheet metal37. Their simulation reveals that increase in grain size shifts forming limit curves upward in FLD. Moreover, grain orientation and morphology effects on the void nucleation were examined by the same authors38.

Beside grain morphology and orientation, the state of twinning and second phases are important in austenitic stainless steels. Twinning is the main mechanism of hardening and elongation improvement in the TWIP steels39. Hwang40 reported that the formability of TWIP steels is not satisfactory despite the adequate tensile responses. However, the effects of strain-induced twinning on the formability of austenitic steel sheets is not recognized well. Mishra et al.41 examined austenitic stainless steel to observe twinning generation under different stretching strain paths. They found that twinning could be generated from both sources of decay of annealing twins and new generation of twins. It was observed under biaxial stretching the maximum twins are generated. Moreover, austenite to \({\alpha }^{^{\prime}}\) -martensite transformation was observed to be strain path dependent. Hong et al.42 explored the effects of strain-induced twinning and martensite in selective laser melted austenitic steel 316 L on the hydrogen embrittlement in a range of temperature. It was observed that based on the temperature value, the hydrogen could results in fracture or enhancing formability of the 316 L steels. Volume of strain-induced martensite under tensile loading condition in various loading rate was measured experimentally by Shen et al.43. It was revealed that increase in the tensile strain increases the volume fraction of martensite fractions.

Using artificial intelligence methods in the science and engineering fields are increasing due to their versatility in modeling complex problems without engaging the physical and mathematical foundations of the problem44,45,46,47,48,49,50,51,52. Moradi et al.44 utilized machine learning method to optimize the chemical condition leading to producing smaller nano-silica particle. Other chemical properties also affected the nano-scale material properties as investigated in many research articles53. Xie et al.45 engaged ANFIS to predict formability of plain carbon steel sheet metals under different rolling conditions. Dislocation density in low carbon steels increases extensively due to cold rolling. The mechanism of the hardening and reducing formability is different in the plain carbon steel from austenitic stainless steels. In plain carbon steel no phase transformation occur in the microstructure of the metal. Beside the phase of metals several other microstructural features arising from different processing of heat treatmetnt, cold working, aging affects the ductility, fracture, machinability, etc. of the metals54,55,56,57,58,59,60,61,62. Recently, Chen et al.63 considered the effects of cold rolling on the formability of 304 L steels. They considered only phenomenological observations in the experimental tests to train a neural network on for prediction of the formability. Indeed, several factors combines in reduction of stretchability of sheets in the case of austenitic stainless steels. Lu et al.64 utilized ANFIS to observe effects of different parameters on the hole expansion process.

As discussed briefly in the above review, effect of the microstructure on the forming limit diagrams are scarcely addressed in the literature. On the other hand, the microstructural features to be considered are numerous. Therefore, incorporation of all microstructural factors is hardly possible in analytical methods. In this sense, using artificial intelligence could be helpful. In this regard, effect of an aspect of microstructural factor, namely existence of stress-induced martensite, on the formability of the stainless sheet metals is investigated in the present study. This study contrasts from other AI studies on the formability with its focus on the microstructural features and not only on the experimental FLD curves. We aim to evaluate the formability of 316 steels with different levels of martensite using experimental and artificial intelligence methods. At the first step, 316 steels with 2 mm initial thickness are annealed and cold rolled to various thicknesses. Afterwards, the relative area of martensite are measured using metallography tests. Formability of the rolled sheets are determined using hemisphere punch test to obtain forming limit diagrams (FLDs). The data obtained from are further utilized to train and validate an artificial neural fuzzy interfere system (ANFIS). After, training the ANFIS, the predictions of the neural network are compared to a new set experimental results.

The sheet metal used in the current study in austenitic stainless steel 316 with the chemical composition presented in Table 1 with initial thickness of 1.5 mm. An annealing process at 1050 °C for 1 h followed by water quenching was conducted to remove any residual stress in the sheet and to obtain a uniform micro structure.

The microstructure of the austenitic steels could be revealed using several etchants. One of the best etchants are 60% nitric acid in distilled water at 1 V direct current for 120 s38. However, this etchant only reveals grain boundaries and the twin boundaries could not be recognized as could be observed in Fig. 1a. One another etchants is acetic glyceregia in which the twin boundaries are well revealed but grain boundaries are not revealed very well as seen in Fig. 1b. Moreover, after transforming metastable austenitic phase to \({\alpha }^{^{\prime}}\) -martensite phase, the martensite could be revealed using acetic glyceregia etchants which is of interest in the current study.

Microstructure of 316 sheet metal after annealing in as received condition as revealed by different etchants, (a) 200x, 60% \({\mathrm{HNO}}_{3}\) in distilled water at 1.5 V for 120 s, and (b) 200x, acetic glyceregia.

The annealed sheets were cut to 11 cm width and 1 m long for the rolling purpose. The cold rolling apparatus had two symmetric rolls with 140 mm diameters. The cold rolling process induces the transformation of austenite to strain-induced martensite in 316 stainless steel. We are seeking the ratio of martensite phase to austenite phase after cold rolling to different thicknesses. A sample of the rolled sheet microstructure is shown in Fig. 2. Figure 2a demonstrates the metallography image of the rolled sample as seen from the normal to sheet direction. In Fig. 2b, the portion of the martensite is contrasted with black color using ImageJ software65. Using the tools in this open-source software it is possible to measure the area of the martensite portion. A detailed fraction of martensite to austenite phase after rolling to various thickness reductions are provided in Table 2.

Microstructure of 316 L sheet after being rolled to 50% thickness reduction as viewed from normal to sheet plane direction, 200x, acetic glyceregia.

The values provided in Table 2 are obtained by averaging martensite fraction measured from three pictures from the different locations of same metallographic sample. Moreover, a quadratic fitting curve is displayed in Fig. 3 to have a closer insight into the effect of cold rolling on the martensite. It is seen that almost a linear correlation is maintained between martensite fraction and cold rolling thickness reduction. However, a quadratic relation has better representation for this relationship.

Change in the martensite fraction as finction of thickness reduction in cold rollign process for initrially annealed 316 sheets.

The forming limit evaluations follow a routine procedure using hemisphere punch test37,38,45,66. In total, six samples with the dimensions given in Fig. 4a are prepared by laser cutting method as one set of experiment samples. For each martensite fraction condition, three sets of test samples are prepared and tested. Figure 4b shows the cut, polished and marked samples.

Nakazima’s forming limit samples dimensions and cut sheets. (a) dimensions, (b) cut and marked samples.

The hemisphere punch test are conducted using hydraulic press with 2 mm/sec displacement rate is used. The contact surfaces of punch and sheet are lubricated sufficiently to minimize the effect of friction on the forming limit values. The tests were continued until an apparent necking or fracture was observed in the sample. In Fig. 5, a fractured sample in apparatus and after test are shown.

Forming limit determination using hemisphere punch test, (a) Test aparatus (b) Sample sheet in aparatus in time of fracture, (c) The same sample after test.

The neural-fuzzy system developed by Jang67 is a suitable tool in predicting forming limit curves of sheet metals. This type of artificial neural networks incorporates the effects of parameters having fuzzy descriptions. It means that they could take any real value in their domain. This type of values is further categorized based on their value. Each category would affected by its respective rule. For example, the temperature value could be any real number, Based on its value it could be categorized as cold, moderate, warm and hot temperature. In this regard, the rule for cold temperature is, for example, “wear a jacket” and for the warm temperature is “A T-shirt is enough”. In the fuzzy logic itself, the output results are evaluated for its accuracy and reliability. Incorporating neural network system with fuzzy logic make it possible to ensure the ANFIS provides reliable results.

A simple neural-fuzzy network is depicted in Fig. 6 as provided by Jang67. As seen in this figure, the network accepts two inputs which in the case of our study the inputs are martensite fraction in microstructure and minor strain value. In the first layer of analysis the fuzzification of the input values is performed using fuzzy rules and membership functions (MFs):

for \(i=1, 2\) , since the input data assumed to have two description categories. The MFs could take any form of triangle, trapezoidal, Gaussian or any other forms.

Schematic of ANFIS layers for two inputs and one outputs67.

Based on the categories of \({A}_{i}\) and \({B}_{i}\) and their MF values some rules are adopted in the layer 2 as depicted in Fig. 7. In this layers, effects of different inputs are combined in a certain way. Here, the following rule are used to combine the effects of martensite fraction and minor strain values:

Fuzzy subspaces for ANFIS with two inputs and four rules.

The output of this layer, \({w}_{i}\) , are called firing strength. These firing strengths are normalized following the below relation in Layer 3:

In Layer 4, Takagi and Sugeno’s rule67,68 is incorporated in the calculations to consider the effects of initial values of input parameters. The following relation is held in this layer:

The obtained \({f}_{i}\) were affected by the normalized values in layers to give the final output which is the value of major strain:

where \(NR\) denotes number of rules. The role of the neural network here is to use its internal optimization algorithms to adjust unknown parameters of the network. The unknown parameter are the consequent parameters \(\left\{{p}_{i}, {q}_{i}, {r}_{i}\right\}\) and parameters related to MFs which are considered to be generalized bell-shape functions:

Forming limit diagrams are dependent on many parameters from chemical composition to history of deformation in the sheet metals. Some parameters are simple to evaluate including the tensile test parameters and some others take more complicated procedure like metallography or determination of residual stress. In most cases, it is beneficial to perform forming limit test on each batch of sheets. However, sometimes the results other tests could be utilized in approximating forming limits. For an account, several studies have utilized tensile testing results to determine the formability of sheets69,70,71,72. Other studies incorporated more parameters like thickness and grain size into account in their analyses31,73,74,75,76,77. However, incorporating all effective parameters are not computationally beneficial. Therefore, using ANFIS models could be a reasonable approach to these problems45,63.

In this work, the effect of martensite fraction value on the forming limit diagram of austenitic steel 316 sheets. In this regard, a data set is prepared using experimental tests. The designed system has two input variables: martensite fraction as measured in metallography tests and minor engineering strain range. The output is taken to be major engineering strain of the forming limit curve. The categories of the martensite fraction is three categories of low, medium and high fractions. With low, it is meant that the martensite fraction is below 10%. In the medium condition, the martensite fraction falls between 10 and 20%. The high value of the martensite is regarded as fractions above 20%. In addition, the minor strain has three distinct categories of between − 5 and 5% near vertical axis for determination of FLD0. The positive and negative ranges are two other categories.

The results of the hemisphere tests are presented in Fig. 8. This figure contains 6 forming limit diagram, 5 of them are the FLDs of a single rolled sheets. The safe points and their upper bound curve, forming limit curve (FLC), are presented. In the last graph, all the FLCs are compared. As seen from the last graph, increase in the martensite fraction of the austenitic steel 316 reduces the formability of the sheet metal. On the other hand, increase in the martensite fraction gradually shapes the FLCs to a symmetric curve about vertical axis. In the last two graphs, the right side of the curves are slightly higher than left side meaning that formability in the biaxial stretch conditions are higher than uniaxial stretch loading. Moreover, both minor and major engineering strains at before necking reduce with increase in the martensite fraction.

Foming limit curves of 316. Effect of martensite fraction on the formability of austenitic steel sheets. (SF safe points, FLC forming limit curve, M martensite).

Training of the neural network is implemented using 60 set of the experimental results of 7.8, 18.3 and 28.7% martensite fractions. The data set from 15.4% martensite are reserved for validation process and 25.6% for testing process. The error after 150 epoch was around 1.5%. The correlation between provided actual output (\({\epsilon }_{1}\) , major engineering strain) for both training and testing are depicted in Fig. 9. As observed, the trained NFS satisfactorily predicts \({\epsilon }_{1}\) for the sheet metals.

(a) correlation between predicted and actual values after training process, (b) Error between predicted and actual values of major engineering strain on FLC for both training and validation process.

In some point during training, the ANFIS network inevitably becomes over-fitted. To recognize this point, a parallel check called “validation” is performed. If the validation error value deviates from the training value, it means that the network is at the beginning of the over-fitting. As seen in Fig. 9b, until epoch 150, the difference between training and validation curves are small and they follow the approximately the same curve. At this point, the error of the validation process begins to deviate from training curve which is the sign of overfitting the ANFIS. Therefore, the ANFIS network at epoch 150 was saved with the error margin of 1.5%. At the next, the FLC predictions of ANFIS are presented. In Fig. 10, the predicted curves and actual curves of the selected samples for training and validation process are given. Since the data from these curves are used for training network, it is not surprising to observe very close predictions.

Actual experimental FLCs versus ANFIS-predicted curves for different martensite fraction conditions. These curves are utilized for training process.

The condition of the last sample is unknown to the ANFIS model. Therefore, we test our trained ANFIS by feeding the martensite fraction of 25.6% sample to obtain the FLC. Figure 11 provides the FLC as predicted by ANFIS along with experimental FLC. The maximum error between the predicted value and experimental ones is 6.2% which is higher than the predicted values in training and validation process. However, this error is an acceptable error in comparison to other studies in which FLC is predicted by theoretical methods37.

Schematic of ANFIS layers for two inputs and one outputs.

In industry, the influencing parameters on the formability are described in a linguistic form. For example, “large grain size decreases the formability” or “increase in cold work drops the FLC”. The inputs of ANFIS network, at the first step, divided into linguistic categories of, for example, low, medium and high. For different category, different rules are adopted by the network. Therefore, in industry this type of network could be very useful in term of both linguistic description of factors and also inclusion of several factors in the analysis. In this work, we tried to incorporate one of the major microstructural features of the austenitic stainless steels into consideration exploiting the capabilities of ANFIS. The amount of stress-induces martensite in the 316 is a direct effect of the cold work in these sheets. Using experimental and ANFIS analyses, it was determined that increase in the martensite fraction in this type of austenitic stainless steels results in significant drop in the FLC of 316 sheets such that increase from 7.8 to 28.7% of martensite fraction drops FLD0 from 0.35 to 0.1, respectively. On the other hand, the trained and validated ANFIS network using 80% of available experimental data could predict the FLC with maximum 6.5% error which is an acceptable error margin in comparison to other theoretical procedures and phenomenological relations.

The datasets used and/or analyzed during the current study available from the corresponding author on reasonable request.

Iftikhar, C. M. A. et al. An evolution of subsequent yield loci under proportional and non-proportional loading path of ‘as-received’ extruded AZ31 magnesium alloy: Experiments and CPFEM modeling. Int. J. Plast. 151, 103216 (2022).

Iftikhar, C. M. A. et al. Evolution of subsequent yield surfaces with plastic deformation along proportional and non-proportional loading paths on annealed AA6061 alloy: Experiments and crystal plasticity finite element modeling. Int. J. Plast 143, 102956 (2021).

Mánik, T., Holmedal, B. & Hopperstad, O. S. Strain-path change induced transients in flow stress, work hardening and r-values in aluminum. Int. J. Plast. 69, 1–20 (2015).

Mamusi, H. et al. A novel experimental approach in determining forming limit diagrams by considering the effect of normal pressure. Int. J. Mater. Form. 15(1), 1 (2022).

Yang, Z. et al. Experimental calibration of ductile fracture parameters and forming limit of AA7075-T6 sheet. J. Mater. Process. Technol. 291, 117044 (2021).

Petritz, A. et al. Imperceptible energy harvesting device and biomedical sensor based on ultraflexible ferroelectric transducers and organic diodes. Nat. Commun. 12(1), 2399 (2021).

Article  ADS  CAS  PubMed  PubMed Central  Google Scholar 

Basak, S. & Panda, S. K. Necking and fracture limit analyses of different pre-strained sheet materials in polar effective plastic strain locus using Yld 2000–2d yield model. J. Mater. Process. Technol. 267, 289–307 (2019).

Basak, S. & Panda, S. K. Failure strains of anisotropic thin sheet metals: Experimental evaluation and theoretical prediction. Int. J. Mech. Sci. 151, 356–374 (2019).

Zhalehfar, F., Hashemi, R. & Hosseinipour, S. J. Experimental and theoretical investigation of strain path change effect on forming limit diagram of AA5083. Int. J. Adv. Manuf. Technol. 76(5–8), 1343–1352 (2015).

Habibi, M. et al. Experimental investigation of mechanical properties, formability and forming limit diagrams for tailor-welded blanks produced by friction stir welding. J. Manuf. Process. 31, 310–323 (2018).

Habibi, M. et al. Forming limit diagrams by including the M-K model in finite element simulation considering the effect of bending. Proc. Inst. Mech. Eng. L 232(8), 625–636 (2018).

Habibi, M. et al. Enhancing the mechanical properties and formability of low carbon steel with dual-phase microstructures. J. Mater. Eng. Perform. 25(2), 382–389 (2016).

Article  MathSciNet  CAS  Google Scholar 

Moayedi, H. et al. Weld orientation effects on the formability of tailor welded thin steel sheets. Thin-Walled Struct. 149, 106669 (2020).

Alipour, M. et al. Finite element and experimental method for analyzing the effects of martensite morphologies on the formability of DP steels. Mech. Based Des. Struct. Mach. 48(5), 525–541 (2020).

Ghazanfari, A. et al. Prediction of FLD for sheet metal by considering through-thickness shear stresses. Mech. Based Des. Struct. Mach. 48(6), 755–772 (2020).

Zhao, H. et al. Quasi-static indentation, low-velocity impact, and resonance responses of the laminated double-curved panel considering various boundary conditions. Thin-Walled Structures 183, 110360 (2023).

Zheng, W. et al. Prediction of nth-order derivatives for vibration responses of a sandwich shell composed of a magnetorheological core and composite face layers. Eng. Anal. Boundary Elem. 146, 170–183 (2023).

Huang, X. et al. Dynamic stability/instability simulation of the rotary size-dependent functionally graded microsystem. Eng. Comput. 38(5), 4163–4179 (2022).

Liu, H. et al. A comprehensive mathematical simulation of the composite size-dependent rotary 3D microsystem via two-dimensional generalized differential quadrature method. Eng. Comput. 38(5), 4181–4196 (2022).

Wu, J. & Habibi, M. Dynamic simulation of the ultra-fast-rotating sandwich cantilever disk via finite element and semi-numerical methods. Eng. Comput. 38(5), 4127–4143 (2022).

Al-Furjan, M. S. H. et al. Enhancing vibration performance of a spinning smart nanocomposite reinforced microstructure conveying fluid flow. Eng. Comput. https://doi.org/10.1007/s00366-020-01255-w (2021).

Guo, J. et al. An intelligent computer method for vibration responses of the spinning multi-layer symmetric nanosystem using multi-physics modeling. Eng. Comput. 38(5), 4217–4238 (2022).

Liu, H. et al. Amplitude motion and frequency simulation of a composite viscoelastic microsystem within modified couple stress elasticity. Eng. Comput. https://doi.org/10.1007/s00366-021-01316-8 (2021).

Kong, F. et al. On the vibrations of the Electrorheological sandwich disk with composite face sheets considering pre and post-yield regions. Thin-Walled Struct. 179, 109631 (2022).

Zhu, L. et al. Predicting the environmental economic dispatch problem for reducing waste nonrenewable materials via an innovative constraint multi-objective Chimp Optimization Algorithm. J. Clean. Prod. 365, 132697 (2022).

Shi, X., Li, J. & Habibi, M. On the statics and dynamics of an electro-thermo-mechanically porous GPLRC nanoshell conveying fluid flow. Mech. Based Des. Struct. Mach. 50(6), 2147–2183 (2022).

Wang, Z. et al. Frequency and buckling responses of a high-speed rotating fiber metal laminated cantilevered microdisk. Mech. Adv. Mater. Struct. 29(10), 1475–1488 (2022).

Chen, F. et al. Investigation on dynamic stability and aeroelastic characteristics of composite curved pipes with any yawed angle. Compos. Struct. 284, 115195 (2022).

Shao, Y. et al. Energy absorption of the strengthened viscoelastic multi-curved composite panel under friction force. Arch. Civil Mech. Eng. 21(4), 141 (2021).

Habibi, M., Taghdir, A. & Safarpour, H. Stability analysis of an electrically cylindrical nanoshell reinforced with graphene nanoplatelets. Compos. B Eng. 175, 107125 (2019).

Yamaguchi, K. & Mellor, P. Thickness and grain size dependence of limit strains in sheet metal stretching. Int. J. Mech. Sci. 18(2), 85–90 (1976).

Wilson, D., Roberts, W. & Rodrigues, P. Effect of grain anisotropy on limit strains in biaxial stretching: Part I. Influence of sheet thickness and grain size in weakly textured sheets. Metall. Trans. A 12(9), 1595–1602 (1981).

Ulvan, E. & Koursaris, A. The effect of grain size on the bulk formability and tensile properties of austenitic stainless steel types 304 and 316. Metall. Trans. A 19(9), 2287–2298 (1988).

Narutani, T. & Takamura, J. Grain-size strengthening in terms of dislocation density measured by resistivity. Acta Metall. Mater. 39(8), 2037–2049 (1991).

Becker, R. & Panchanadeeswaran, S. Effects of grain interactions on deformation and local texture in polycrystals. Acta Metall. Mater. 43(7), 2701–2719 (1995).

Wu, P. et al. Crystal plasticity forming limit diagram analysis of rolled aluminum sheets. Metall. Mater. Trans. A. 29(2), 527–535 (1998).

Amelirad, O. & Assempour, A. Experimental and crystal plasticity evaluation of grain size effect on formability of austenitic stainless steel sheets. J. Manuf. Process. 47, 310–323 (2019).

Amelirad, O. & Assempour, A. Coupled continuum damage mechanics and crystal plasticity model and its application in damage evolution in polycrystalline aggregates. Eng. Comput. https://doi.org/10.1007/s00366-021-01346-2 (2021).

Chung, K. et al. Formability of TWIP (twinning induced plasticity) automotive sheets. Int. J. Plast. 27(1), 52–81 (2011).

Article  ADS  CAS  Google Scholar 

Hwang, J.-K. Low formability and reduction of area in twinning-induced plasticity steels despite their excellent tensile elongation. Mater. Sci. Eng. A 779, 139123 (2020).

Mishra, S., Narasimhan, K. & Samajdar, I. Deformation twinning in AISI 316L austenitic stainless steel: Role of strain and strain path. Mater. Sci. Technol. 23(9), 1118–1126 (2007).

Article  ADS  CAS  Google Scholar 

Hong, Y. et al. Strain-induced twins and martensite: Effects on hydrogen embrittlement of selective laser melted (SLM) 316 L stainless steel. Corros. Sci. 208, 110669 (2022).

Shen, Y. F. et al. Twinning and martensite in a 304 austenitic stainless steel. Mater. Sci. Eng. A 552, 514–522 (2012).

Moradi, H. et al. Machine learning modeling and DOE-assisted optimization in synthesis of nanosilica particles via Stöber method. Adv. Nano Res. 12(4), 387–403 (2022).

Xie, Y. et al. Effects of thickness reduction in cold rolling process on the formability of sheet metals using ANFIS. Sci. Rep. 12(1), 10434 (2022).

Article  ADS  CAS  PubMed  PubMed Central  Google Scholar 

Singh, R., Kainthola, A. & Singh, T. Estimation of elastic constant of rocks using an ANFIS approach. Appl. Soft Comput. 12(1), 40–45 (2012).

Umrao, R. K. et al. Determination of strength and modulus of elasticity of heterogenous sedimentary rocks: An ANFIS predictive technique. Measurement 126, 194–201 (2018).

Lingamdinne, L. P. et al. Functionalized bentonite for removal of Pb(II) and As(V) from surface water: Predicting capability and mechanism using artificial neural network. J. Water Process Eng. 51, 103386 (2023).

Vatanpour, V. et al. Highly antifouling polymer-nanoparticle-nanoparticle/polymer hybrid membranes. Sci. Total Environ. 810, 152228 (2022).

Article  ADS  CAS  PubMed  Google Scholar 

Vatanpour, V. et al. Hyperbranched polyethylenimine functionalized silica/polysulfone nanocomposite membranes for water purification. Chemosphere 290, 133363 (2022).

Article  ADS  CAS  PubMed  Google Scholar 

Moradi, H. et al. Experimental and numerical study on diazinon removal using plasma bubble column reactor: Modeling, kinetics, mechanisms, and degradation products. J. Environ. Chem. Eng. 10(5), 108291 (2022).

Asgharnejad Lamraski, M. B. et al. Thermodynamic modeling of several alcohol-hydrocarbon binary mixtures at low to moderate conditions. J. Mol. Liq. 346, 117924 (2022).

Zhu, H. & Zhao, R. Isolated Ni atoms induced edge stabilities and equilibrium shapes of CVD-prepared hexagonal boron nitride on the Ni(111) surface. New J. Chem. 46(36), 17496–17504 (2022).

Deng, H. et al. Microstructure and mechanical properties of dissimilar NiTi/Ti6Al4V joints via back-heating assisted friction stir welding. J. Manuf. Process. 64, 379–391 (2021).

Zhang, P. et al. Water jet impact damage mechanism and dynamic penetration energy absorption of 2A12 aluminum alloy. Vacuum 206, 111532 (2022).

Article  ADS  CAS  Google Scholar 

Zhang, P. et al. Effect of aging plus cryogenic treatment on the machinability of 7075 aluminum alloy. Vacuum 208, 111692 (2023).

Article  ADS  CAS  Google Scholar 

Zhang, P. et al. Effect of heat treatment process on the micro machinability of 7075 aluminum alloy. Vacuum 207, 111574 (2023).

Article  ADS  CAS  Google Scholar 

Yuhua, C. et al. Investigation of welding crack in micro laser welded NiTiNb shape memory alloy and Ti6Al4V alloy dissimilar metals joints. Opt. Laser Technol. 91, 197–202 (2017).

Liang, L. et al. Effect of welding thermal treatment on the microstructure and mechanical properties of nickel-based superalloy fabricated by selective laser melting. Mater. Sci. Eng. A 819, 141507 (2021).

Liao, D. et al. Probabilistic framework for fatigue life assessment of notched components under size effects. Int. J. Mech. Sci. 181, 105685 (2020).

Niu, X. et al. Defect tolerant fatigue assessment of AM materials: Size effect and probabilistic prospects. Int. J. Fatigue 160, 106884 (2022).

Xu, H. et al. Transient thermomechanical analysis of micro cylindrical asperity sliding contact of SnSbCu alloy. Tribol. Int. 167, 107362 (2022).

Chen, X. et al. The capability of coupled fuzzy logic and adaptive neural network in the formability prediction of steel sheets. Waves Random Complex Media https://doi.org/10.1080/17455030.2022.2162154 (2023).

Lu, Y.-H. et al. Study of using ANFIS to the prediction in the bore-expanding process. Int. J. Adv. Manuf. Technol. 26(5–6), 544–551 (2005).

Abràmoff, M. D., Magalhães, P. J. & Ram, S. J. Image processing with ImageJ. Biophotonics Int. 11, 36–42 (2004).

Habibi, M. et al. Determination of forming limit diagram using two modified finite element models. Mech. Eng. 48(4), 141–144 (2017).

Jang, J. R. ANFIS: Adaptive-network-based fuzzy inference system. IEEE Trans. Syst. Man Cybern. 23(3), 665–685 (1993).

Takagi, T. & Sugeno, M. Fuzzy identification of systems and its applications to modeling and control. IEEE Trans. Syst. Man Cybern. 1, 116–132 (1985).

Xu, S. & Weinmann, K. J. On predicting forming limits using hill’s yield criteria. J. Mater. Eng. Perform. 9(2), 174–182 (2000).

Ghosh, A. K. & Hecker, S. S. Failure in thin sheets stretched over rigid punches. Metall. Trans. A 6(5), 1065–1074 (1975).

Hashemi, R., Mamusi, H. & Masoumi, A. A simulation-based approach to the determination of forming limit diagrams. Proc. Inst. Mech. Eng. B 228(12), 1582–1591 (2014).

He, J. et al. M-K analysis of forming limit diagram under stretch-bending. J. Manuf. Sci. Eng. https://doi.org/10.1115/1.4024536 (2013).

Dilmec, M. et al. Effects of sheet thickness and anisotropy on forming limit curves of AA2024-T4. Int. J. Adv. Manuf. Technol. 67(9–12), 2689–2700 (2013).

Ghazanfari, A. et al. Investigation on the effective range of the through thickness shear stress on forming limit diagram using a modified Marciniak-Kuczynski model. Modares Mech. Eng. 16(1), 137–143 (2016).

Ma, B. et al. Evaluation of the forming limit curve of medium steel plate based on non-constant through-thickness normal stress. J. Manuf. Process. 33, 175–183 (2018).

Wilson, D., Mirshams, A. & Roberts, W. An experimental study of the effect of sheet thickness and grain size on limit-strains in biaxial stretching. Int. J. Mech. Sci. 25(12), 859–870 (1983).

Ma, B. et al. The effect of the through-thickness normal stress on sheet formability. J. Manuf. Process. 21, 134–140 (2016).

This work was supported by Chongqing city Yongchuan District Bureau of science and technology (2021yc-jckx20015). This work was supported by 2021 Dalian Ocean University Science and technology innovation team funding project (c202114), 2020 scientific research fund project of Liaoning Provincial Department of Education (ql202017), General project of Liaoning Provincial Department of science and Technology (ljkz0734).

Chongqing Creation Vocational College, Yongchuan, 402160, Chongqing, China

College of Applied Technology, Dalian Ocean University, Dalian, 116300, Liaoning, China

Faculty of Engineering, Islamic Azad University, North Tehran Branch, Tehran, Iran

You can also search for this author in PubMed  Google Scholar

You can also search for this author in PubMed  Google Scholar

You can also search for this author in PubMed  Google Scholar

M.Z. developed artificial intelligence model, wrote the respective part of the manuscript, Z.M. supervised the project and integrated experimental and modeling sections, M.S. co-supervised the project, performed experimental works and wrote the respective part of the manuscript. M.Z. and MS. prepared the figures. All authors reviewed the manuscript.

Correspondence to Zheng Meng or Morteza Shariati.

The authors declare no competing interests.

Springer Nature remains neutral with regard to jurisdictional claims in published maps and institutional affiliations.

Open Access This article is licensed under a Creative Commons Attribution 4.0 International License, which permits use, sharing, adaptation, distribution and reproduction in any medium or format, as long as you give appropriate credit to the original author(s) and the source, provide a link to the Creative Commons licence, and indicate if changes were made. The images or other third party material in this article are included in the article's Creative Commons licence, unless indicated otherwise in a credit line to the material. If material is not included in the article's Creative Commons licence and your intended use is not permitted by statutory regulation or exceeds the permitted use, you will need to obtain permission directly from the copyright holder. To view a copy of this licence, visit http://creativecommons.org/licenses/by/4.0/.

Zhang, M., Meng, Z. & Shariati, M. ANFIS-based forming limit prediction of stainless steel 316 sheet metals. Sci Rep 13, 3115 (2023). https://doi.org/10.1038/s41598-023-28719-5

DOI: https://doi.org/10.1038/s41598-023-28719-5

Anyone you share the following link with will be able to read this content:

Sorry, a shareable link is not currently available for this article.

Provided by the Springer Nature SharedIt content-sharing initiative

By submitting a comment you agree to abide by our Terms and Community Guidelines. If you find something abusive or that does not comply with our terms or guidelines please flag it as inappropriate.

Scientific Reports (Sci Rep) ISSN 2045-2322 (online)

ANFIS-based forming limit prediction of stainless steel 316 sheet metals | Scientific Reports

904l Stainless Steel Strip Sign up for the Nature Briefing newsletter — what matters in science, free to your inbox daily.