Related papers: Monotone Peridynamic Neural Operator for Nonlinear Material Modeling with Conditionally Unique Solutions

Monotone Peridynamic Neural Operator for Nonlinear Material Modeling with Conditionally Unique Solutions

URL: http://arxiv.org/abs/2505.01060v1
Date: Fri, 02 May 2025 07:10:31 GMT
Title: Monotone Peridynamic Neural Operator for Nonlinear Material Modeling with Conditionally Unique Solutions
Authors: Jihong Wang, Xiaochuan Tian, Zhongqiang Zhang, Stewart Silling, Siavash Jafarzadeh, Yue Yu,
Abstract summary: We introduce monotone peridynamic neural operator (MPNO), a novel data-driven nonlocal model learning approach based on neural operators.<n>MPNO learns a nonlocal kernel together with a nonlinear relation, while ensuring solution uniqueness through a monotone gradient network.<n>We show that MPNO exhibits superior generalization capabilities than the conventional neural networks.
Score: 8.178003326156418
License: http://creativecommons.org/licenses/by-nc-nd/4.0/
Abstract: Data-driven methods have emerged as powerful tools for modeling the responses of complex nonlinear materials directly from experimental measurements. Among these methods, the data-driven constitutive models present advantages in physical interpretability and generalizability across different boundary conditions/domain settings. However, the well-posedness of these learned models is generally not guaranteed a priori, which makes the models prone to non-physical solutions in downstream simulation tasks. In this study, we introduce monotone peridynamic neural operator (MPNO), a novel data-driven nonlocal constitutive model learning approach based on neural operators. Our approach learns a nonlocal kernel together with a nonlinear constitutive relation, while ensuring solution uniqueness through a monotone gradient network. This architectural constraint on gradient induces convexity of the learnt energy density function, thereby guaranteeing solution uniqueness of MPNO in small deformation regimes. To validate our approach, we evaluate MPNO's performance on both synthetic and real-world datasets. On synthetic datasets with manufactured kernel and constitutive relation, we show that the learnt model converges to the ground-truth as the measurement grid size decreases both theoretically and numerically. Additionally, our MPNO exhibits superior generalization capabilities than the conventional neural networks: it yields smaller displacement solution errors in down-stream tasks with new and unseen loadings. Finally, we showcase the practical utility of our approach through applications in learning a homogenized model from molecular dynamics data, highlighting its expressivity and robustness in real-world scenarios.

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