The nonlinear Schr\"odinger equation in the half-space

Abstract

The present paper is concerned with the half-space Dirichlet problem equation Pc problem-abstract - v + v = |v|p-1v,\ in RN+, v = c,\ on ∂ RN+,\ xN ∞ v(x',xN) = 0 uniformly in x' ∈ RN-1, equation where RN+ := \\,x ∈ RN: xN > 0\, \ for some N ≥ 1 and p > 1, c > 0 are constants. We analyse the existence, non-existence and multiplicity of bounded positive solutions to problem-abstract. We prove that the existence and multiplicity of bounded positive solutions to problem-abstract depend in a striking way on the value of c > 0 and also on the dimension N. We find an explicit number cp ∈ (1,e), depending only on p, which determines the threshold between existence and non-existence. In particular, in dimensions N ≥ 2, we prove that, for 0 < c < cp, problem problem-abstract admits infinitely many bounded positive solutions, whereas, for c > cp, there are no bounded positive solutions to problem-abstract.