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 Num. Meth. Prog., 2014, Volume 15, Issue 3, Pages 417–426 (Mi vmp261)

An exponentially convergent method for solving boundary integral equations on polygons

I. O. Arushanyan

M. V. Lomonosov Moscow State University, Faculty of Mechanics and Mathematics

Abstract: The boundary integral equation of the potential theory in the case of the inner Dirichlet problem for the Laplace operator and the system of boundary integral equations of the Dirichlet boundary value problem for the two-dimensional theory of elasticity in domains with a finite number of corner points are considered. The derivatives of kernels and solutions to the above integral equations on the boundaries of simply connected polygons are estimated. A numerical method based on the application of one and the same family of composite quadrature formulas is proposed. It is proved that the proposed method is exponentially convergent with respect to the number of the quadrature nodes in use.

Keywords: double-layer potential, boundary integral equations, corner points, condensing grids, quadrature method, Dirichlet problem, Laplace operator, potential theory, two-dimensional theory of elasticity.

Full text: PDF file (224 kB)
UDC: 519.6

Citation: I. O. Arushanyan, “An exponentially convergent method for solving boundary integral equations on polygons”, Num. Meth. Prog., 15:3 (2014), 417–426

Citation in format AMSBIB
\Bibitem{Aru14} \by I.~O.~Arushanyan \paper An exponentially convergent method for solving boundary integral equations on polygons \jour Num. Meth. Prog. \yr 2014 \vol 15 \issue 3 \pages 417--426 \mathnet{http://mi.mathnet.ru/vmp261} 

• http://mi.mathnet.ru/eng/vmp261
• http://mi.mathnet.ru/eng/vmp/v15/i3/p417

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Citing articles on Google Scholar: Russian citations, English citations
Related articles on Google Scholar: Russian articles, English articles

This publication is cited in the following articles:
1. I. O. Arushanyan, “Numerical solution of boundary integral equations of the plane theory of elasticity in curvilinear polygons”, Moscow University Mathematics Bulletin, 70:4 (2015), 193–196