An accurate triangular spectral element method-based numerical simulation for acoustic problems in complex geometries

Ye, Ximeng; Qin, Guoliang; Wang, Shaobin

doi:10.1177/1475472x20930647

Cited by 2 publications

(1 citation statement)

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“…For example, the finite element method (FEM) divides the computational domain into small elements and handles them in the same way [26,27]. Similar ideas are also adopted in the development from spectral method to the spectral element method (SEM) [28][29][30]. It provides FEM/SEM great flexibility to be independent of the computational domain and the boundary conditions, which enables a wide application of FEM.…”

Section: Introductionmentioning

confidence: 99%

Learning Transient Partial Differential Equations with Local Neural Operators

Ye¹,

Li²,

Jiang³

et al. 2022

Preprint

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In decades, enormous computational resources are poured into solving the transient partial differential equations for multifarious physical fields. The latest artificial intelligence has shown great potential in accelerating these computations, but its road to wide applications is hindered by the variety of computational domains and boundary conditions. Here, we overcome this obstacle by constructing a learning framework capable of purely representing the transient PDEs with local neural operators (LNOs). This framework is demonstrated in learning several transient PDEs, especially the Navier-Stokes equations, and successfully applied to solve problems with quite different domains and boundaries, including the internal flow, the external flow, and remarkably, the flow across the cascade of airfoils. In these applications, our LNOs are faster than the conventional numerical solver by over 1000 times, which could be significant for scientific computations and engineering simulations.

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Section: Introductionmentioning

confidence: 99%