EXPONENTIAL DECAY ESTIMATES OF THE EIGENVALUES FOR THE NEUMANN-POINCARE OPERATOR ON ANALYTIC BOUNDARIES IN TWO DIMENSIONS

Ando, Kazunori; Kang, Hyeonbae; Miyanishi, Yoshihisa

doi:10.1216/JIE-2018-30-4-473

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EXPONENTIAL DECAY ESTIMATES OF THE EIGENVALUES FOR THE NEUMANN-POINCARE OPERATOR ON ANALYTIC BOUNDARIES IN TWO DIMENSIONS

Ando, Kazunori;
Kang, Hyeonbae;
Miyanishi, Yoshihisa

Citations

WEB OF SCIENCE

17

Citations

SCOPUS

16

초록

We show that the eigenvalues of the Neumann-Poincare operator on analytic boundaries of simply connected bounded planar domains tend to zero exponentially fast, and the exponential convergence rate is determined by the maximal Grauert radius of the boundary. We present a few examples of boundaries to show that the estimate is optimal.

키워드

Neumann-Poincare operator; eigenvalues; analytic boundary; exponential decay; maximal Grauert radius; SPECTRAL PROPERTIES; PLASMON RESONANCE; DOMAINS; EQUATION

제목: EXPONENTIAL DECAY ESTIMATES OF THE EIGENVALUES FOR THE NEUMANN-POINCARE OPERATOR ON ANALYTIC BOUNDARIES IN TWO DIMENSIONS

저자: Ando, Kazunori; Kang, Hyeonbae; Miyanishi, Yoshihisa

DOI: 10.1216/JIE-2018-30-4-473

발행일: 2018

유형: Article

저널명: Journal of Integral Equations and Applications

권: 30

호: 4

페이지: 473 ~ 489