One-dimensional symmetry of positive bounded solutions to the nonlinear Schr\"odinger equation in the half-space

Abstract

We are concerned with the half-space Dirichlet problem \[arrayll - v+v=|v|p-1v & in\ RN+, v=c\ on\ ∂RN+, &xN ∞v(x',xN)=0\ uniformly in\ x'∈RN-1, array \] where RN+=\x∈ RN \ : \ xN>0\ for some N≥ 2, and p>1, c>0 are constants. It was shown recently by Fernandez and Weth [Math. Ann. (2021)] that there exists an explicit number cp∈ (1,e), depending only on p, such that for 0<c<cp there are infinitely many bounded positive solutions, whereas, for c>cp there are no bounded positive solutions. If N=2,\ 3, we show that in the case c = cp there is no other bounded positive solution besides the one-dimensional one.