Volume 48, pp. 462-478, 2018.
Conformal modulus and planar domains with strong singularities and cusps
Harri Hakula, Antti Rasila, and Matti Vuorinen
Abstract
We study the problem of computing the conformal modulus of rings and quadrilaterals with strong singularities and cusps at their boundary. We reduce this problem to the numerical solution of the associated Dirichlet and Dirichlet-Neumann-type boundary values problems for the Laplace equation. Several experimental results, with error estimates, are reported. In particular, we consider domains with dendrite-like boundaries where an analytic formula for the conformal modulus can be derived. The boundary value problems are solved using an $hp$-finite element method.
Full Text (PDF) [2.7 MB], BibTeX
Key words
conformal capacity, conformal modulus, quadrilateral modulus, $hp$-FEM, numerical conformal mapping
AMS subject classifications
65E05, 31A15, 30C85
Links to the cited ETNA articles
[15] | Vol. 40 (2013), pp. 436-451 Harri Hakula, Antti Rasila, and Matti Vuorinen: Computation of exterior moduli of quadrilaterals |
ETNA articles which cite this article
Vol. 54 (2021), pp. 460-482 Harri Hakula, Semen Nasyrov, and Matti Vuorinen: Conformal moduli of symmetric circular quadrilaterals with cusps |
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