In this paper, we propose a new deep learning method, named finite volume method (DFVM) to solve high-dimension partial differential equations (PDEs). The key idea of DFVM is that we construct a new loss function under the framework of the finite volume method. The weak formulation makes DFVM more feasible to solve general high dimensional PDEs defined on arbitrarily shaped domains. Numerical solutions obtained by DFVM also enjoy physical conservation property in the control volume of each sampling point, which is not available in other existing deep learning methods. Numerical results illustrate that DFVM not only reduces the computation cost but also obtains more accurate approximate solutions. Specifically, for high-dimensional linear and nonlinear elliptic PDEs, DFVM provides better approximations than DGM and WAN, by one order of magnitude. The relative error obtained by DFVM is slightly smaller than that obtained by PINN, but the computation cost of DFVM is an order of magnitude less than that of the PINN. For the time-dependent Black-Scholes equation, DFVM gives better approximations than PINN, by one order of magnitude.

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