D 2014

A note on wavelet methods for singularly perturbed problems

FINĚK, Václav and Dana ČERNÁ

Basic information

Original name

A note on wavelet methods for singularly perturbed problems

Authors

FINĚK, Václav (203 Czech Republic, guarantor, belonging to the institution) and Dana ČERNÁ (203 Czech Republic)

Edition

MELVILLE, NY 11747-4501 USA, APPLICATIONS OF MATHEMATICS IN ENGINEERING AND ECONOMICS (AMEE'14), AIP Conference Proceedings, Vol. 1631, p. 111-113, 3 pp. 2014

Publisher

American Institute of Physics

Other information

Language

English

Type of outcome

Proceedings paper

Field of Study

General mathematics

Country of publisher

United States of America

Confidentiality degree

is not subject to a state or trade secret

Publication form

electronic version available online

References:

RIV identification code

RIV/46747885:24510/14:#0001137

Organization

Faculty of Science, Humanities and Education – Technical University of Liberec – Repository

ISBN

978-0-7354-1270-5

ISSN

UT WoS

000346058100017

Keywords in English

Cubic wavelets; preconditioning; singularly perturbed problems
Changed: 1/4/2015 08:18, Václav Finěk

Abstract

V originále

Many problems in science and technology can be modeled by boundary value problems for singularly perturbed differential equations. In the modeling of these processes, one can observe boundary and interior layers whose width can be arbitrary small. To solve such types of problems a lot of methods were proposed. In this contribution, we focus on methods based on wavelets. Using wavelet discretization of singularly perturbed two-point boundary value problems, one can observe that condition numbers of arising stiffness matrices are growing with decreasing parameter epsilon when an unsymmetric part starts to dominate. We propose here a new simple diagonal preconditioning which significantly improves condition numbers of stiffness matrices for small value of parameter epsilon. Numerical examples are given.