Publication result detail

The Density of Infinitely Differentiable Functions in Sobolev Spaces with Mixed Boundary Cinditions

ŽENÍŠEK, A.

Original 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

Peer-reviewed article not indexed in WoS or Scopus

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

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

density theorems, finite element method

Key words in English

density theorems, finite element method

Authors

ŽENÍŠEK, A.

RIV year

2011

Released

01.01.2006

ISBN

0862-7940

Periodical

Applications of Mathematics

Volume

51

Number

5

State

Czech Republic

Pages from

517

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",
  pages="31",
  issn="0862-7940"
}