On the Cauchy problem of fractional Schrödinger equation with Hartree type nonlinearity
arXiv:1209.5899
Abstract
We study the Cauchy problem for the fractional Schrödinger equation $$ i\partial_tu = (m^2-Î)^\frac\alpha2 u + F(u) in \mathbb{R}^{1+n}, $$ where $ n \ge 1$, $m \ge 0$, $1 < α< 2$, and $F$ stands for the nonlinearity of Hartree type: $$F(u) = λ(\frac{Ï(\cdot)}{|\cdot|^γ} * |u|^2)u$$ with $λ= \pm1, 0 <γ< n$, and $0 \le Ï\in L^\infty(\mathbb R^n)$. We prove the existence and uniqueness of local and global solutions for certain $α$, $γ$, $λ$, $Ï$. We also remark on finite time blowup of solutions when $λ= -1$.