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Main Authors: Corso, Thiago Carvalho, Hassan, Muhammad, Jha, Abhinav, Stamm, Benjamin
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2401.16344
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author Corso, Thiago Carvalho
Hassan, Muhammad
Jha, Abhinav
Stamm, Benjamin
author_facet Corso, Thiago Carvalho
Hassan, Muhammad
Jha, Abhinav
Stamm, Benjamin
contents In this paper we derive several (and in many cases sharp) estimates for the $\mathrm{L}^2$-trace norm of harmonic functions along circular arcs. More precisely, we obtain geometry-dependent estimates on the norm, spectral radius, and numerical range of the Dirchlet-to-Dirichlet (DtD) operator sending data on the boundary of the disk to the restriction of its harmonic extension along circular arcs inside the disk. The estimates we derive here have applications in the convergence analysis of the Schwarz domain decomposition method for overlapping disks in two dimensions. In particular, they allow us to establish a rigorous convergence proof for the discrete parallel Schwarz method applied to the Conductor-like Screening Model (COSMO) from theoretical chemistry in the two-disk case, and to derive error estimates with respect to the discretization parameter, the number of Schwarz iterations, and the geometry of the domain. Our analysis addresses challenges beyond classical domain decomposition theory, especially the weak enforcement of boundary conditions.
format Preprint
id arxiv_https___arxiv_org_abs_2401_16344
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Trace estimates for harmonic functions along circular arcs with applications to domain decomposition on overlapping disks
Corso, Thiago Carvalho
Hassan, Muhammad
Jha, Abhinav
Stamm, Benjamin
Analysis of PDEs
35J05, 30C40, 65N55
In this paper we derive several (and in many cases sharp) estimates for the $\mathrm{L}^2$-trace norm of harmonic functions along circular arcs. More precisely, we obtain geometry-dependent estimates on the norm, spectral radius, and numerical range of the Dirchlet-to-Dirichlet (DtD) operator sending data on the boundary of the disk to the restriction of its harmonic extension along circular arcs inside the disk. The estimates we derive here have applications in the convergence analysis of the Schwarz domain decomposition method for overlapping disks in two dimensions. In particular, they allow us to establish a rigorous convergence proof for the discrete parallel Schwarz method applied to the Conductor-like Screening Model (COSMO) from theoretical chemistry in the two-disk case, and to derive error estimates with respect to the discretization parameter, the number of Schwarz iterations, and the geometry of the domain. Our analysis addresses challenges beyond classical domain decomposition theory, especially the weak enforcement of boundary conditions.
title Trace estimates for harmonic functions along circular arcs with applications to domain decomposition on overlapping disks
topic Analysis of PDEs
35J05, 30C40, 65N55
url https://arxiv.org/abs/2401.16344