Author:
Gong Xingtian,Yang Shuwei
Abstract
AbstractThe Cauchy problem of the Laplace equation is investigated for both exact and perturbed data on a doubly connected domain, i.e., the numerical reconstruction of the function value and the normal derivative value on a part of the boundary from the knowledge of exact or noisy Cauchy data on the remaining and accessible boundary, which is completely different from the Cauchy problem on a simply connected bounded region. We first establish the existence of a solution through the potential theory. By expressing the solution as a sum of single-layer potentials using boundary value condition, we get the integral equation systems about the density function on the boundary, and by applying local regularization scheme to the obtained integral equation systems, we get the regularization solution of the original problem. Some numerical results are presented to validate the applicability and effectiveness of the proposed method.
Publisher
Springer Science and Business Media LLC
Subject
Algebra and Number Theory,Analysis
Reference22 articles.
1. Murota, K.: Comparison of conventional and “invariant” schemes of fundamental solutions method for annular domains. Jpn. J. Ind. Appl. Math. 12(1), 61–85 (1995)
2. El-shenawy, A., Shirokova, E.A.: The approximate solution of 2D Dirichlet problem in doubly connected domains. Adv. Math. Phys. 2018, Article ID 6951513 (2018)
3. El-Shenawy, A., Shirokova, E.A.: A Cauchy integral method to solve the 2D Dirichlet and Neumann problems for irregular simply-connected domains. Uch. Zap. Kazan. Univ. Ser. Fiz.-Mat. Nauki 160(4), 778–787 (2018)
4. Lesnic, D.: The boundary element method for solving the Laplace equation in two-dimensions with oblique derivative boundary conditions. Commun. Numer. Methods Eng. 23(12), 1071–1080 (2007)
5. Cakoni, F., Kress, R.: Integral equation methods for the inverse obstacle problem with generalized impedance boundary condition. Inverse Probl. 29(1), 015005 (2013)