Regularity for the planar optimal p-compliance problem

Abstract

In this paper we prove a partial C1,α regularity result in dimension N=2 for the optimal p-compliance problem, extending for p = 2 some of the results obtained by A. Chambolle, J. Lamboley, A. Lemenant, E. Stepanov (2017). Because of the lack of good monotonicity estimates for the p-energy when p = 2, we employ an alternative technique based on a compactness argument leading to a p-energy decay at any flat point. We finally obtain that every optimal set has no loop, is Ahlfors regular, and C1,α at H1-a.e. point for every p ∈ (1 ,+∞).