Shape optimization for a nonlinear elliptic problem related to thermal insulation

Abstract

In this paper we consider a minimization problem of the type Iβ,p(D;)=∈f\∫ Dφpdx+β ∫∂* φpdHn-1,\; φ ∈ W1,p(),\;φ ≥ 1 \;in\;D\, where is a bounded connected open set in Rn, D⊂ is a compact set and β is a positive constant. We let the set D vary under prescribed geometrical constraints and D of fixed thickness, in order to look for the best (or worst) geometry in terms of minimization (or maximization) of Iβ,p. In the planar case, we show that under perimeter constraint the disk maximize Iβ,p. In the n-dimensional case we restrict our analysis to convex sets showing that the same is true for the ball but under different geometrical constraints.

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