2015
Hermite Cubic Spline Multi-wavelets on the Cube
FINEK, Václav, Dana CERNA and Daniela CVEJNOVÁBasic information
Original name
Hermite Cubic Spline Multi-wavelets on the Cube
Authors
FINEK, Václav (203 Czech Republic, guarantor, belonging to the institution), Dana CERNA (203 Czech Republic, belonging to the institution) and Daniela CVEJNOVÁ (203 Czech Republic)
Edition
USA, 41ST INTERNATIONAL CONFERENCE APPLICATIONS OF MATHEMATICS IN ENGINEERING AND ECONOMICS (AMEE'15) , AIP Conference Proceedings 1690, p. nestránkováno, 4 pp. 2015
Publisher
AMER INST PHYSICS
Other information
Language
English
Type of outcome
Proceedings paper
Field of Study
General mathematics
Country of publisher
Bulgaria
Confidentiality degree
is not subject to a state or trade secret
Publication form
electronic version available online
RIV identification code
RIV/46747885:24510/15:#0001299
Organization
Faculty of Science, Humanities and Education – Technical University of Liberec – Repository
ISBN
978-0-7354-1337-5
ISSN
UT WoS
000366565600027
Keywords in English
Hermite cubic spline multi-wavelets; sparse representation; Riesz constant
Changed: 18/4/2016 17:56, Mgr. Jiří Šmída, Ph.D.
Abstract
V originále
In 2000, W. Dahmen et al. proposed a construction of Hermite cubic spline multi-wavelets adapted to the interval [0, 1]. Later, several more simple constructions of wavelet bases based on Hermite cubic splines were proposed. We focus here on wavelet basis with respect to which both the mass and stiffness matrices are sparse in the sense that the number of non-zero elements in each column is bounded by a constant. Then, a matrix-vector multiplication in adaptive wavelet methods can be performed exactly with linear complexity for any second order differential equation with constant coefficients. In this contribution, we shortly review these constructions, use an anisotropic tensor product to obtain bases on the cube [0, 1]^3, and compare their condition numbers.