Nonhomogeneous Boundary Value Problems of Nonlinear Schr\"odinger Equations in a Half Plane

Abstract

This paper discusses the initial-boundary-value problems (IBVP) of nonlinear Schr\"odinger equations posed in a half plane R × R+ with nonhomogeneous Dirichlet boundary conditions. For any given s 0, if the initial data (x, y) are in Sobolev space Hs(R× R+) with the boundary data h ( x, t) in an optimal space Hs(0,T) as defined in the introduction, which is slightly weaker than the space H(2s+1)/4t ([0, T]; Lx2(R ) ) L2t ( [ 0, T]; Hs+ 1/2 x ( R ) ), the local well-posedness of the IBVP in C ( [0, T] ; Hs ( R× R+ ) ) is proved. The global well-posedness is also discussed for s = 1. The main idea of the proof is to derive a boundary integral operator for the corresponding nonhomogeneous boundary condition and obtain the Strichartz's estimates for this operator. The results presented in the paper hold for the IBVP posed in a half space Rn× R+ with any n>1.