Detail publikace
Homogenization of heat equation with hysteresis
FRANCŮ, J.
Anglický název
Homogenization of heat equation with hysteresis
Typ
Článek recenzovaný mimo WoS a Scopus
Jazyk
en
Originální abstrakt
The contribution delas with heat equaition in the form (c u+W[u])_t=div(a.grad u)=f, where the functional operator W[u] is Prandtl-Ishlinskii hysteresis operator of play type characterized by a distribution function eta. The spatially dependent initial boundary value problem is studied. Proof of existence and uniqueness of the solution is omitted since the proof is a slightly modified proof by Brokate-Sprekels. The homogenization problem for this equation si studied. For eps->0, a sequence of problems of the above type with spatially eps-periodic coefficients c^eps, eta,^eps, a^eps si considered. The coefficients c^star,eta^star and a^star in the homogenized problem are identified and convergence of the corresponding solutions u^eps to u^star is proved.
Vydáno
2003-01-01
ISSN
0378-4754
Časopis
MATHEMATICS AND COMPUTERS IN SIMULATION
Ročník
61
Číslo
3-5
Strany od–do
591–
Počet stran
7
BIBTEX
@article{BUT42039,
author="Jan {Franců}",
title="Homogenization of heat equation with hysteresis",
journal="MATHEMATICS AND COMPUTERS IN SIMULATION",
year="2003",
volume="61",
number="3-5",
pages="7",
issn="0378-4754"
}