Well-posedness of nolinear fractional Schr\"odinger and wave equations in Sobolev spaces

Abstract

We prove the well-posed results in sub-critical and critical cases for the pure power-type nonlinear fractional Schr\"odinger equations on Rd. These results extend the previous ones in HongSire for σ≥ 2. This covers the well-known result for the Schr\"odinger equation σ = 2 given in CazenaveWeissler. In the case σ ∈ (0,2) \1\, we give the local well-posedness in sub-critical case for all exponent > 1 in contrast of ones in HongSire. This also generalizes the ones of ChoHwangKwonLee when d = 1 and of GuoHuo when d ≥ 2 where the authors considered the cubic fractional Schr\"odinger equation with σ∈ (1,2). We also give the global existence in energy space under some assumptions. We finally prove the local well-posedness in sub-critical and critical cases for the pure power-type nonlinear fractional wave equations.