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Deep Neural Network Approach to Forward-Inverse Problems

arXiv:1907.12925

summary

The paper introduces a feed‑forward deep neural network framework that simultaneously approximates solutions of differential equations and identifies model parameters from data, providing theoretical convergence guarantees and demonstrating the approach on several PDEs and a dynamical system.

Abstract

In this paper, we construct approximated solutions of Differential Equations (DEs) using the Deep Neural Network (DNN). Furthermore, we present an architecture that includes the process of finding model parameters through experimental data, the inverse problem. That is, we provide a unified framework of DNN architecture that approximates an analytic solution and its model parameters simultaneously. The architecture consists of a feed forward DNN with non-linear activation functions depending on DEs, automatic differentiation, reduction of order, and gradient based optimization method. We also prove theoretically that the proposed DNN solution converges to an analytic solution in a suitable function space for fundamental DEs. Finally, we perform numerical experiments to validate the robustness of our simplistic DNN architecture for 1D transport equation, 2D heat equation, 2D wave equation, and the Lotka-Volterra system.

Topics & keywords

#differential equations#neural networks#inverse problems#physics-informed learning#automatic differentiationfeedforward neural networkgradient‑based optimizationreduction of ordertheoretical convergenceLotka‑Volterra system