On 1D mass subcritical nonlinear Schr\''odinger and Hartree equations in modulation spaces Mp, p' \ (p<2)

Abstract

We establish well-posedness theory for the 1D mass-subcritical nonlinear Schr\"odinger equation (NLS) having power-type nonlinearity |u|α-1u in a certain modulation spaces Mp,p'(R), where p' is a H\"older conjugate of p, with 4/3<p<2 and p sufficiently close to 2. Modulation spaces have been successfully applied in understanding the dynamics of NLS near the Sobolev scaling critical regularity. In fact, despite cubic NLS is ill-posed in Hs for s<-1/2, our analysis reveals that it experiences well-posedness in modulation spaces for a Cauchy data in (Hs L2) Mp,p'. The proof adopts two different approaches to establish local well-posedness for α ∈ (1,5), one exploits generalised Strichartz estimates in Fourier-Lebesgue and Lebesgue spaces; the other implements Bourgain's high-low decomposition (BHLD) method in the modulation space setting. The local solution via the (BHLD) method can be extended to global-in-time, but with a certain loss of regularity. We could combine these effectively and establish global well-posedness in Mp,p' with the persistence of regularity for 1<α ≤ 10/3. This is the first global result in Mp,p' which establishes the persistence of regularity. Similar results are also established for the Hartree equations.

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