The nodal set of solutions to some nonlocal sublinear problems

Abstract

We study the nodal set of solutions to equations of the form (-)s u = λ+ (u+)q-1 - λ- (u-)q-1 B1, where λ+,λ->0, q ∈ [1,2), and u+ and u- are respectively the positive and negative part of u. This collection of nonlinearities includes the unstable two-phase membrane problem q=1 as well as sublinear equations for 1<q<2. We initially prove the validity of the strong unique continuation property and the finiteness of the vanishing order, in order to implement a blow-up analysis of the nodal set. As in the local case s=1, we prove that the admissible vanishing orders can not exceed the critical value kq= 2s/(2- q). Moreover, we study the regularity of the nodal set and we prove a stratification result. Ultimately, for those parameters such that kq< 1, we prove a remarkable difference with the local case: solutions can only vanish with order kq and the problem admits one dimensional solutions. Our approach is based on the validity of either a family of Almgren-type or a 2-parameter family of Weiss-type monotonicity formulas, according to the vanishing order of the solution.