Abstract We study the one-phase Alt–Phillips free boundary problem, focusing on the case of negative exponents (-2, 0) γ ∈ (- 2, 0). The goal of this paper is twofold. On the one hand, we prove smoothness of C^1, C 1, α -regular free boundaries by reducing the problem to a class of degenerate quasilinear PDEs, for which we establish Schauder estimates. Such a method provides a unified proof of the smoothness for general exponents. On the other hand, by exploiting the higher regularity of solutions, we derive a new stability condition for the Alt–Phillips problem in the negative exponent regime, ruling out the existence of nontrivial axially symmetric stable cones in low dimensions. Finally, we provide a variational criterion for the stability of cones in the Alt–Phillips problem, which recovers the one for minimal surfaces in the singular limit as -2 γ → - 2.
Carducci et al. (Fri,) studied this question.