Related papers: Spatio-Temporal Super-Resolution of Dynamical Systems using Physics-Informed Deep-Learning

Spatio-Temporal Super-Resolution of Dynamical Systems using Physics-Informed Deep-Learning

URL: http://arxiv.org/abs/2212.04457v1
Date: Thu, 8 Dec 2022 18:30:18 GMT
Title: Spatio-Temporal Super-Resolution of Dynamical Systems using Physics-Informed Deep-Learning
Authors: Rajat Arora and Ankit Shrivastava
Abstract summary: We propose a physics-informed deep learning-based framework to enhance spatial and temporal resolution of PDE solutions. The framework consists of two trainable modules independently super-resolve (both in space and time) PDE solutions. The proposed framework is well-suited for integration with traditional numerical methods to reduce computational complexity during engineering design.
Score: 0.0
License: http://creativecommons.org/licenses/by/4.0/
Abstract: This work presents a physics-informed deep learning-based super-resolution framework to enhance the spatio-temporal resolution of the solution of time-dependent partial differential equations (PDE). Prior works on deep learning-based super-resolution models have shown promise in accelerating engineering design by reducing the computational expense of traditional numerical schemes. However, these models heavily rely on the availability of high-resolution (HR) labeled data needed during training. In this work, we propose a physics-informed deep learning-based framework to enhance the spatial and temporal resolution of coarse-scale (both in space and time) PDE solutions without requiring any HR data. The framework consists of two trainable modules independently super-resolving the PDE solution, first in spatial and then in temporal direction. The physics based losses are implemented in a novel way to ensure tight coupling between the spatio-temporally refined outputs at different times and improve framework accuracy. We analyze the capability of the developed framework by investigating its performance on an elastodynamics problem. It is observed that the proposed framework can successfully super-resolve (both in space and time) the low-resolution PDE solutions while satisfying physics-based constraints and yielding high accuracy. Furthermore, the analysis and obtained speed-up show that the proposed framework is well-suited for integration with traditional numerical methods to reduce computational complexity during engineering design.

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