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A Quadratic Serendipity Finite Volume Element Method on Arbitrary Convex Polygonal Meshes
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作者 Yanlong Zhang 《Communications in Computational Physics》 SCIE 2023年第6期116-131,共16页
Based on the idea of serendipity element,we construct and analyze the first quadratic serendipity finite volume element method for arbitrary convex polygonalmeshes in this article.The explicit construction of quadrati... Based on the idea of serendipity element,we construct and analyze the first quadratic serendipity finite volume element method for arbitrary convex polygonalmeshes in this article.The explicit construction of quadratic serendipity element shape function is introduced from the linear generalized barycentric coordinates,and the quadratic serendipity element function space based on Wachspress coordinate is selected as the trial function space.Moreover,we construct a family of unified dual partitions for arbitrary convex polygonal meshes,which is crucial to finite volume element scheme,and propose a quadratic serendipity polygonal finite volume element method with fewer degrees of freedom.Finally,under certain geometric assumption conditions,the optimal H1 error estimate for the quadratic serendipity polygonal finite volume element scheme is obtained,and verified by numerical experiments. 展开更多
关键词 Quadratic serendipity polygonal finite volume element method arbitrary convex polygonal meshes wachspress coordinate unified dual partitions optimal H1 error estimate
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