Rate of convergence estimates for the spectral approximation of a generalized eigenvalue problem

Conca, C; Duran, M; Rappaz, J

Abstract

The aim of this work is to derive rate of convergence estimates for the spectral approximation of a mathematical model which describes the vibrations of a solid-fluid type structure. First, we summarize the main theoretical results and the discretization of this variational eigenvalue problem. Then, we state some well known abstract theorems on spectral approximation and apply them to our specific problem, which allow us to obtain the desired spectral convergence. By using classical regularity results, we are able to establish estimates for the rate of convergence of the approximated eigenvalues and for the gap between generalized eigenspaces.

Más información

Título de la Revista: NUMERISCHE MATHEMATIK
Volumen: 79
Número: 3
Editorial: SPRINGER HEIDELBERG
Fecha de publicación: 1998
Página de inicio: 349
Página final: 369
URL: http://www.scopus.com/inward/record.url?eid=2-s2.0-0041171354&partnerID=q2rCbXpz