The nodal set of solutions to some elliptic problems: singular nonlinearities

Abstract

This paper deals with solutions to the equation equation* - u = λ+ (u+)q-1 - λ- (u-)q-1 in B1 equation* where λ+,λ- > 0, q ∈ (0,1), B1=B1(0) is the unit ball in RN, N 2, and u+:= \u,0\, u-:= \-u,0\ are the positive and the negative part of u, respectively. We extend to this class of singular equations the results recently obtained in SoTe2018 for sublinear and discontinuous equations, 1≤ q<2, namely: (a) the finiteness of the vanishing order at every point and the complete characterization of the order spectrum; (b) a weak non-degeneracy property; (c) regularity of the nodal set of any solution: the nodal set is a locally finite collection of regular codimension one manifolds up to a residual singular set having Hausdorff dimension at most N-2 (locally finite when N=2). As an intermediate step, we establish the regularity of a class of not necessarily minimal solutions. The proofs are based on a priori bounds, monotonicity formul \ for a 2-parameter family of Weiss-type functionals, blow-up arguments, and the classification of homogenous solutions.