Global well-posedness, scattering and blow-up for the energy-critical, Schr\"odinger equation with indefinite potential in the radial case

Abstract

In this paper, we study the well-posedness theory and the scattering asymptotics for the energy-critical, Schr\"odinger equation with indefinite potential equation* \arrayl i ∂t u+ u-V(x)u +|u|4N-2u=0,\ (x, t) ∈ RN × R, \\ .u|t=0=u0 ∈ H 1(RN), array. equation* where V(x):RN→ R is indefinite and satisfies appropriate conditions. Using contraction mapping method and concentration compactness argument, we obtain the well-posedness theory in proper function spaces and scattering asymptotics. Moreover, we get a positive ground state solution which is radially symmetric by using variational methods. This paper extends the results of KCEMF2006(Invent. Math) to the potential equation and develops the recent conclusions.