Archivio Istituzionale della RicercaWe prove a homogenization theorem for non-convex functionals depending on vector-valued functions, defined on Sobolev spaces with respect to oscillating measures. The proof combines the use of the localization methods of -convergence with a ‘discretization’ argument, which allows to link the oscillating energies to functionals defined on a single Lebesgue space, and to state the hypothesis of p-connectedness of the underlying periodic measure in a handy way.
Non convex homogenization problems for singular structures / Braides, A; CHIADO' PIAT, Valeria. - In: NETWORKS AND HETEROGENEOUS MEDIA. - ISSN 1556-1801. - STAMPA. - 3:3(2008), pp. 489-508.
Non convex homogenization problems for singular structures
CHIADO' PIAT, Valeria
2008
Abstract
We prove a homogenization theorem for non-convex functionals depending on vector-valued functions, defined on Sobolev spaces with respect to oscillating measures. The proof combines the use of the localization methods of -convergence with a ‘discretization’ argument, which allows to link the oscillating energies to functionals defined on a single Lebesgue space, and to state the hypothesis of p-connectedness of the underlying periodic measure in a handy way.
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https://hdl.handle.net/11583/1630916
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