Partial regularity for the optimal p-compliance problem with length penalization

Abstract

We establish a partial C1,α regularity result for minimizers of the optimal p-compliance problem with length penalization in any spatial dimension N≥ 2, extending some of the results obtained in [Chambolle-Lamboley-Lemenant-Stepanov 17], [Bulanyi-Lemenant 20]. The key feature is that the C1,α regularity of minimizers for some free boundary type problem is investigated with a free boundary set of codimension N-1. We prove that every optimal set cannot contain closed loops, and it is C1,α regular at H1-a.e. point for every p∈ (N-1,+∞).

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