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Isogeometric analysis of boundary integral equations: High-order collocation methods for the singular and hyper-singular equations

Matthias Taus

Institute for Computational Engineering and Sciences, University of Texas at Austin, Austin, TX 78712, USA

E-mail Address: matthias.taus@gmail.com

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Gregory J. Rodin

Institute for Computational Engineering and Sciences, University of Texas at Austin, Austin, TX 78712, USA

E-mail Address: gjr@ices.utexas.edu

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Thomas J. R. Hughes

Institute for Computational Engineering and Sciences, University of Texas at Austin, Austin, TX 78712, USA

E-mail Address: hughes@ices.utexas.edu

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https://doi.org/10.1142/S0218202516500354Cited by:19 (Source: Crossref)

Abstract

Isogeometric analysis is applied to boundary integral equations corresponding to boundary-value problems governed by Laplace’s equation. It is shown that the smoothness of geometric parametrizations central to computer-aided design can be exploited for regularizing integral operators to obtain high-order collocation methods involving superior approximation and numerical integration schemes. The regularization is applicable to both singular and hyper-singular integral equations, and as a result one can formulate the governing integral equations so that the corresponding linear algebraic equations are well-conditioned. It is demonstrated that the proposed approach allows one to compute accurate approximate solutions which optimally converge to the exact ones.

Communicated by F. Brezzi

Keywords:

AMSC: 22E46, 53C35, 57S20

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