We are interested in the thermal insulation of a bounded open set Ω surrounded by a set whose thickness is locally described by ϵh, where h is a nonnegative function defined on the boundary ∂ Ω. We study the problem in the limit for ϵ going to zero using a first-order asymptotic development by Γ-convergence.
ON THE OPTIMAL SHAPE OF A THIN INSULATING LAYER
Acampora P.;
2024-01-01
Abstract
We are interested in the thermal insulation of a bounded open set Ω surrounded by a set whose thickness is locally described by ϵh, where h is a nonnegative function defined on the boundary ∂ Ω. We study the problem in the limit for ϵ going to zero using a first-order asymptotic development by Γ-convergence.File in questo prodotto:
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