Schr\"odinger equations with singular potentials: linear and nonlinear boundary value problems

Abstract

Let ⊂ RN (N ≥ 3) be a C2 bounded domain and F ⊂ ∂ be a C2 submanifold of dimension 0 ≤ k ≤ N-2. Put δF(x)=dist(x,F), V=δF-2 in and Lγ V= + γ V. Denote by CH(V) the Hardy constant relative to V in . We study positive solutions of equations (LE) -Lγ V u = 0 and (NE) -Lγ V u+ f(u) = 0 in when γ < CH(V) and f ∈ C( R) is an odd, monotone increasing function. We establish the existence of a normalized boundary trace for positive solutions of (LE) - first studied by Marcus and Nguyen for the case F=∂ - and employ it to investigate the behavior of subsolutions and super solutions of (LE) at the boundary. Using these results we study boundary value problems for (NE) and derive a-priori estimates. Finally we discuss subcriticality of (NE) at boundary points of and establish existence and stability results when the data is concentrated on the set of subcritical points.