2003
DOI: 10.1051/cocv:2003022
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Homogenization of highly oscillating boundaries and reduction of dimension for a monotone problem

Abstract: Abstract.We investigate the asymptotic behaviour, as ε → 0, of a class of monotone nonlinear Neumann problems, with growth p − 1 (p ∈]1, +∞[), on a bounded multidomain Ωε ⊂ R N (N ≥ 2). The multidomain Ωε is composed of two domains. The first one is a plate which becomes asymptotically flat, with thickness hε in the xN direction, as ε → 0. The second one is a "forest" of cylinders distributed with ε-periodicity in the first N − 1 directions on the upper side of the plate. Each cylinder has a small cross sectio… Show more

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Cited by 36 publications
(36 citation statements)
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“…Since the classes of admissible controls K (1) ε and K (1) ε are defined on variable spaces depending on ε, we should introduce the special convergence of controls. Definition 3.1.…”
Section: Convergence Results For the Admissible Controlsmentioning
confidence: 99%
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“…Since the classes of admissible controls K (1) ε and K (1) ε are defined on variable spaces depending on ε, we should introduce the special convergence of controls. Definition 3.1.…”
Section: Convergence Results For the Admissible Controlsmentioning
confidence: 99%
“…From definitions of the sets K (1) ε and K (2) ε (see (0.1), (0.2)) it follows that these controls are restrictions of functions from the following sets…”
Section: Properties Of Problem Cp ε For a Fixed Value εmentioning
confidence: 99%
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