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In this article we highlight how the Fonseca and Muller blow-up technique is particularly well suited for homogenization problems. As examples we give a simple proof of the non-linear homogenization theorem for integral functionals and we prove a homogenization theorem for sets of finite perimeter.

Braides, A., Maslennikov, M., Sigalotti, L. (2008). Homogenization by blow-up. APPLICABLE ANALYSIS, 87(12), 1341-1356 [10.1080/00036810802555458].

Homogenization by blow-up

BRAIDES, ANDREA;
2008-01-01

Abstract

In this article we highlight how the Fonseca and Muller blow-up technique is particularly well suited for homogenization problems. As examples we give a simple proof of the non-linear homogenization theorem for integral functionals and we prove a homogenization theorem for sets of finite perimeter.
2008
Pubblicato
Rilevanza internazionale
Articolo
Sì, ma tipo non specificato
Settore MAT/05 - ANALISI MATEMATICA
English
FINITE PERIMETER; FUNCTIONALS; SEMICONTINUITY; CONVERGENCE; PARTITIONS; SETS
16
Braides, A., Maslennikov, M., Sigalotti, L. (2008). Homogenization by blow-up. APPLICABLE ANALYSIS, 87(12), 1341-1356 [10.1080/00036810802555458].
Braides, A; Maslennikov, M; Sigalotti, L
Articolo su rivista
01 - Articolo su rivista
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/2108/29410
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