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The physics-informed neural network (PINN) is able to identify partial differential equation (PDE) coefficients which are constant across the space directly from physical measurements. In this paper, we propose a modification of PINN, named as SD-PINN, which can recover the coefficients in spatially-dependent PDEs using only one neural network without the requirement of domain-specific physical knowledge. The network structure is a simple fully connected neural network, and multiple physical information like the time-invariance and spatial-smoothness of the PDE coefficients is incorporated as loss functions. The method is robust to noise due to introduced physical constraints, which is verified by experiments.
Liu et al. (Fri,) studied this question.
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