Ahlfors-regularity for minimizers of a multiphase optimal design problem

Abstract

We establish an Alhfors-regularity result for minimizers of a multiphase optimal design problem. It is a variant of the classical variational problem which involves a finite number of chambers E(i) of prescribed volume that partition a given domain ⊂Rn. The cost functional associated with a configuration (\E(i)\i,u) is made up of the perimeter of the partition interfaces and a Dirichlet energy term, which is discontinuous across the interfaces. We prove that the union of the optimal interfaces is (n-1)-Alhfors-regular via a penalization method and decay estimates of the energy.