Modeling and Analysis of an Optimal Insulation Problem on Non-Smooth Domains
Abstract
In this paper, we study an insulation problem that seeks the optimal distribution of a fixed amount m>0 of insulating material coating an insulated boundary I⊂eq ∂ of a thermally conducting body ⊂eq Rd, d∈ N. The thickness of the thin insulating layer I is given locally via d, where d I [0,+∞) specifies the (to be determined) distribution of the insulating material. We establish (L2(Rd))-convergence of the problem (as 0+). Different from the existing literature, which predominantly assumes that the thermally conducting body has a C1,1-boundary, we merely assume that I is piece-wise flat. To overcome this lack of boundary regularity, we define the thin insulating boundary layer I using a Lipschitz continuous transversal vector field rather than the outward unit normal vector field. The piece-wise flatness condition on I is only needed to prove the -estimate. In fact, for the -estimate is enough that the thermally conducting body has a C0,1-boundary.
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