A space–time Trefftz discontinuous Galerkin method for the acoustic wave equation in first-order formulation

被引：0

作者：

Andrea Moiola

Ilaria Perugia

机构：

[1] University of Reading,Department of Mathematics and Statistics

[2] University of Pavia,Department of Mathematics

[3] University of Vienna,Faculty of Mathematics

来源：

Numerische Mathematik | 2018年 / 138卷

关键词：

65M60; 65M15; 41A10; 41A25; 35L05;

D O I：

暂无

中图分类号：

学科分类号：

摘要：

We introduce a space–time Trefftz discontinuous Galerkin method for the first-order transient acoustic wave equations in arbitrary space dimensions, extending the one-dimensional scheme of Kretzschmar et al. (IMA J Numer Anal 36:1599–1635, 2016). Test and trial discrete functions are space–time piecewise polynomial solutions of the wave equations. We prove well-posedness and a priori error bounds in both skeleton-based and mesh-independent norms. The space–time formulation corresponds to an implicit time-stepping scheme, if posed on meshes partitioned in time slabs, or to an explicit scheme, if posed on “tent-pitched” meshes. We describe two Trefftz polynomial discrete spaces, introduce bases for them and prove optimal, high-order h-convergence bounds.

引用

页码：389 / 435

页数：46

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[42] Moiola A(undefined)undefined undefined undefined undefined-undefined
[43] Perugia I(undefined)undefined undefined undefined undefined-undefined
[44] Hughes TJR(undefined)undefined undefined undefined undefined-undefined
[45] Hulbert GM(undefined)undefined undefined undefined undefined-undefined
[46] Johnson C(undefined)undefined undefined undefined undefined-undefined
[47] Kretzschmar F(undefined)undefined undefined undefined undefined-undefined
[48] Moiola A(undefined)undefined undefined undefined undefined-undefined
[49] Perugia I(undefined)undefined undefined undefined undefined-undefined
[50] Schnepp SM(undefined)undefined undefined undefined undefined-undefined

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