The average distance problem with perimeter-to-area ratio penalization

Abstract

In this paper we consider the functional equation* Ep,():=∫ p(x, ) x+ 1( )2(). equation* Here p≥ 1, >0 are given parameters, the unknown varies among compact, convex, Hausdorff two-dimensional sets of 2, denotes the boundary of , and (x, ):=∈fy∈ |x-y|. The integral term ∫ p(x, ) x quantifies the "easiness" for points in to reach the boundary, while 1( )2() is the perimeter-to-area ratio. The main aim is to prove existence and C1,1-regularity of minimizers of .