The mixed fractional Hartree equations in Fourier amalgam and modulation spaces

Abstract: We prove local and global well-posedness for mixed fractional Hartree equation with low regularity Cauchy data in Fourier amalgam $\widehat{w}^{p,q}$ and modulation $M^{p,q}$ spaces. Similar results also hold for the Hartree equation with harmonic potential in some modulation spaces. Our approach also addresses Hartree-Fock equations of finitely many particles. A key ingredient of our method is to establish trilinear estimates for Hartree non-linearity and the use of Strichartz estimates. As a consequence, we could gain $\widehat{w}^{p,q}$ and $M^{p,q}-$regularity for all $p,q\in [1, \infty].$ Thus we could solve new problems, extends and complements several previous results (including Sobolev $H^s-$regularity results).