Publication detail
The Density of Infinitely Differentiable Functions in Sobolev Spaces with Mixed Boundary Cinditions
ŽENÍŠEK, A.
Czech title
The Density of Infinitely Differentiable Functions in Sobolev Spaces with Mixed Boundary Cinditions
English title
The Density of Infinitely Differentiable Functions in Sobolev Spaces with Mixed Boundary Cinditions
Type
journal article - other
Language
en
Original abstract
We present a detailed proof of the density of the set C^{\infty}\overline{\Omega}V in the space of test function V\inH^1(\Omega) that vanish on some part of the boundary \diff\Omega of a bounded domain \Omega
Czech abstract
We present a detailed proof of the density of the set C^{\infty}\overline{\Omega}V in the space of test function V\inH^1(\Omega) that vanish on some part of the boundary \diff\Omega of a bounded domain \Omega
English abstract
We present a detailed proof of the density of the set C^{\infty}\overline{\Omega}V in the space of test function V\inH^1(\Omega) that vanish on some part of the boundary \diff\Omega of a bounded domain \Omega
Keywords in English
density theorems, finite element method
RIV year
2006
Released
01.01.2006
ISSN
0862-7940
Journal
APPLICATIONS OF MATHEMATICS
Volume
51
Number
5
Pages count
31
BIBTEX
@article{BUT45248,
author="Alexander {Ženíšek},
title="The Density of Infinitely Differentiable Functions in Sobolev Spaces with Mixed Boundary Cinditions",
journal="APPLICATIONS OF MATHEMATICS",
year="2006",
volume="51",
number="5",
month="January",
issn="0862-7940"
}