Global well-posedness for fractional Hartree equation on modulation spaces and Fourier algebra

Abstract

We study the Cauchy problem for fractional Schr\"odinger equation with cubic convolution nonlinearity (i∂t u - (-)α2u (K |u|2) u =0) with Cauchy data in the modulation spaces Mp,q( Rd). For K(x)= |x|-γ (0< γ< min \α, d/2\), we establish global well-posedness results in Mp,q( Rd) (1≤ p ≤ 2, 1≤ q < 2d/ (d+γ)) when α =2, d≥ 1, and with radial Cauchy data when d≥ 2, 2d2d-1< α < 2. Similar results are proven in Fourier algebra FL1( Rd) L2( Rd).