C∞ regularity of the Alt-Phillips Functional for negative powers

Abstract

In this paper, we study the regularity of the free boundary for minimizers of the Alt-Phillips functional with negative powers \[Eγ(u)=∫12|∇ u|2+1γu-γ\u>0\dx,γ∈(0,2).\] We proved that the free boundaries are C∞ at regular points. A key technical tool is the linearized operator for the PDE satisfied by the partial derivatives of a solution to the Alt-Phillips Euler-Lagrange equation in the negative power case. For this operator we establish a comparison principle, which may have further applications to the Alt-Phillips problem with negative powers.