A generalized strange term in Signorini's type problems

Conca, C; Murat, F; Timofte C.

Abstract

The limit behavior of the solutions of Signorini's type-like problems in periodically perforated domains with period ? is studied. The main feature of this limit behaviour is the existence of a critical size of the perforations that separates different emerging phenomena as ? ? 0. In the critical case, it is shown that Signorini's problem converges to a problem associated to a new operator which is the sum of a standard homogenized operator and an extra zero order term ("strange term") coming from the geometry; its appearance is due to the special size of the holes. The limit problem captures the two sources of oscillations involved in this kind of free boundary-value problems, namely, those arising from the size of the holes and those due to the periodic inhomogeneity of the medium. The main ingredient of the method used in the proof is an explicit construction of suitable test functions which provide a good understanding of the interactions between the above mentioned sources of oscillations.

Más información

Título según WOS: A generalized strange term in Signorini's type problems
Título según SCOPUS: A generalized strange term in Signorini's type problems
Título de la Revista: ESAIM-MATHEMATICAL MODELLING AND NUMERICAL ANALYSIS-MODELISATION MATHEMATIQUE ET ANALYSE NUMERIQUE
Volumen: 37
Número: 5
Editorial: EDP SCIENCES S A
Fecha de publicación: 2003
Página de inicio: 773
Página final: 805
Idioma: English
URL: http://www.esaim-m2an.org/10.1051/m2an:2003055
DOI:

10.1051/m2an:2003055

Notas: ISI, SCOPUS