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The double-layer potential operator over polyhedral domains II: Spline Galerkin methods

✍ Scribed by Johannes Elschner

Book ID
102948262
Publisher
John Wiley and Sons
Year
1992
Tongue
English
Weight
752 KB
Volume
15
Category
Article
ISSN
0170-4214

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✦ Synopsis

Abstract

We examine the numerical approximation of the integral equation (Ξ» βˆ’ K)u =f, where K is the double layer (harmonic) potential operator on a closed polyhedral surface in ℝ^3^ and Ξ», ∣λ∣β‰₯1, is a complex constant. The solution is approximated by Galerkin's method, which is based on piecewise polynomials of arbitrary degree on graded triangulations. By utilizing spline spaces which are modified in that the trial functions vanish on some of the triangles closest to the vertices and edges, we investigate the stability of this method in L^2^. Furthermore, the use of suitably graded meshes leads to the same quasioptimal error estimates as in the case of a smooth surface.

πŸ“œ SIMILAR VOLUMES

Finite Section Method for the Double Lay
Finite Section Method for the Double Layer Potential Operator over Polyhedral Boundaries
✍ A. Rathsfeld πŸ“‚ Article πŸ“… 1992 πŸ› John Wiley and Sons 🌐 English βš– 382 KB

## Abstract In this paper we consider the finite section method for the solution of the double layer potential equation corresponding to Laplace's equation in a three‐dimensional polyhedron. We prove the stability of our method in case of special polyhedrons.