Spatial plane waves for the nonlinear Schr\"odinger equation: local existence and stability results

Abstract

We consider the Cauchy problem for the nonlinear Schr\"odinger equation on R2, iut + uxx + uyy + λ|u|σ u =0, λ∈ R, σ>0. We introduce new functional spaces over which the initial value problem is well-posed. Their construction is based on spatial plane waves (cf. arXiv:1510.08745). These spaces contain H1(R2) and do not lie within L2(R2). We prove several global well-posedness and stability results over these new spaces, including a new global well-posedness result of H1 solutions with indefinitely large H1 and L2 norms. Some of these results are proved using a new functional transform, the plane wave transform. We develop a suitable theory for this transform, prove several properties and solve classical linear PDE's with it, highlighting its wide range of application.