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We study the homogenization of a stationary random maximal monotone operator on a probability space equipped with an ergodic dynamical system. The proof relies on Fitzpatrick's variational formulation of monotone relations, on Visintin's scale integration/disintegration theory and on Tartar-Murat's compensated compactness. We provide applications to systems of PDEs with random coefficients arising in electromagnetism and in nonlinear elasticity.

Stochastic homogenization of maximal monotone relations and applications

Veneroni, Marco
2018-01-01

Abstract

We study the homogenization of a stationary random maximal monotone operator on a probability space equipped with an ergodic dynamical system. The proof relies on Fitzpatrick's variational formulation of monotone relations, on Visintin's scale integration/disintegration theory and on Tartar-Murat's compensated compactness. We provide applications to systems of PDEs with random coefficients arising in electromagnetism and in nonlinear elasticity.
2018
The Mathematics category includes resources dealing with mathematics, applied mathematics, statistics and probability.
NETWORKS AND HETEROGENEOUS MEDIA
WOS:000447342500002
2-s2.0-85043486923
Esperti anonimi
Inglese
Internazionale
ELETTRONICO
13
1
27
45
19
Fitzpatrick representation; Maximal monotonicity; Nonlinear elasticity; Ohm-Hall conduction; Random media; Stochastic homogenization; Statistics and Probability; Engineering (all); Computer Science Applications1707 Computer Vision and Pattern Recognition; Applied Mathematics
http://aimsciences.org/article/doi/10.3934/nhm.2018002
no
3
info:eu-repo/semantics/article
262
Lussardi, Luca; Marini, Stefano; Veneroni, Marco
1 Contributo su Rivista::1.1 Articolo in rivista
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1.1 Articolo in rivista
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11571/1214295
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