Detail publikace
Semiregular finite elements in solving some nonlinear problem
ZLÁMALOVÁ, J.
Anglický název
Semiregular finite elements in solving some nonlinear problem
Typ
Článek recenzovaný mimo WoS a Scopus
Jazyk
en
Originální abstrakt
The finite element analysis of the variational problem which is formally equivalent to a two-dimensional nonlinear elliptic boundary value problem with mixed nonhomogeneous boundary conditions. The given problem is solved in the case of a bounded domain whose boundary consists of two circles with the same centre. Difference between the radii of circles is very small with respect to radidus. An elliptic problem given on such a domain has many practical applications (let us mention, for example, the cartilage between a joint and hip, or an air-crevice between a rotor and stator in an electromachine). The finite element analysis of this problem is restricted to the case of semiregular triangular finite elements with polynomials of the first degree.
Klíčová slova anglicky
finite element method, semiregular elements
Vydáno
2001-01-01
ISSN
0862-7940
Časopis
Applications of Mathematics
Ročník
46
Číslo
1
Strany od–do
53–77
Počet stran
24
BIBTEX
@article{BUT42418,
author="Jana {Hoderová}",
title="Semiregular finite elements in solving some nonlinear problem",
journal="Applications of Mathematics",
year="2001",
volume="46",
number="1",
pages="53--77",
issn="0862-7940"
}