arXiv:2012.03425 Abstract | arXiv Analytics

arXiv:2012.03425 [math.NA]Abstract References Reviews Resources

Multipatch Discontinuous Galerkin IGA for the Biharmonic Problem On Surfaces

Published 2020-12-07Version 1

We present the analysis of interior penalty discontinuous Galerkin Isogeometric Analysis (dGIGA) for the biharmonic problem on orientable surfaces $\Omega \subset \mathbb{R}^3.$ Here, we consider a surface consisting of several non-overlapping patches as typical in multipatch dGIGA. Due to the non-overlapping nature of the patches, we construct NURBS approximation spaces which are discontinuous across the patch interfaces via a penalty scheme. By an appropriate discrete norm, we present \textit{a priori} error estimates for the non-symmetric, symmetric and semi-symmetric interior penalty methods. Finally, we confirm our theoritical results with numerical experiments.

Comments: 20 pages; 7 figures

Categories: math.NA, cs.NA

Subjects: 65N30, 65N22, 65N15, G.1.0, G.1.3, G.1.8

Keywords: multipatch discontinuous galerkin iga, biharmonic problem, penalty discontinuous galerkin isogeometric analysis, interior penalty discontinuous galerkin isogeometric, semi-symmetric interior penalty methods

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