Wavelet bases for the biharmonic problem

Bímová, Daniela, Černá, Dana, and Finěk, Václav. "Wavelet bases for the biharmonic problem." Programs and Algorithms of Numerical Mathematics. Prague: Institute of Mathematics AS CR, 2013. 15-20. <http://eudml.org/doc/271320>.

@inProceedings{Bímová2013,
abstract = {In our contribution, we study different Riesz wavelet bases in Sobolev spaces based on cubic splines satisfying homogeneous Dirichlet boundary conditions of the second order. These bases are consequently applied to the numerical solution of the biharmonic problem and their quantitative properties are compared.},
author = {Bímová, Daniela, Černá, Dana, Finěk, Václav},
booktitle = {Programs and Algorithms of Numerical Mathematics},
keywords = {wavelet basis; adaptive wavelet method; finite element method; biharmonic problem},
location = {Prague},
pages = {15-20},
publisher = {Institute of Mathematics AS CR},
title = {Wavelet bases for the biharmonic problem},
url = {http://eudml.org/doc/271320},
year = {2013},
}

TY - CLSWK
AU - Bímová, Daniela
AU - Černá, Dana
AU - Finěk, Václav
TI - Wavelet bases for the biharmonic problem
T2 - Programs and Algorithms of Numerical Mathematics
PY - 2013
CY - Prague
PB - Institute of Mathematics AS CR
SP - 15
EP - 20
AB - In our contribution, we study different Riesz wavelet bases in Sobolev spaces based on cubic splines satisfying homogeneous Dirichlet boundary conditions of the second order. These bases are consequently applied to the numerical solution of the biharmonic problem and their quantitative properties are compared.
KW - wavelet basis; adaptive wavelet method; finite element method; biharmonic problem
UR - http://eudml.org/doc/271320
ER -