The two-phase Alt-Phillips problem for quasilinear operators

Abstract

We establish interior regularity and optimal growth estimates for sign-changing minimizers of the p-singular or p-degenerate quasilinear Alt--Phillips functional throughout the full range of 1<p<∞ and of the nonlinearity power 0<γ<p. In addition, we obtain local finite perimeter and density estimates, from which we deduce the local (N-1)-rectifiability of the reduced and two-phase free boundaries and the local finiteness of their (N-1)-dimensional Hausdorff measure for a restricted range of γ.