Local/global well-posedness analysis of time-space fractional Schrödinger equation on Rd

Abstract

We investigate a class of nonlinear time-space fractional Schrödinger equations with nonlocal effects in both time and space. The time derivative is of Achar type, and the space operator is a ϕ(-Δ)-type operator defined via a Bernstein function ϕ. This nonlocality invalidates classical Strichartz estimates. By combining asymptotic analysis of Mittag-Leffler functions, the Hörmander multiplier theorem, and harmonic analysis techniques, we establish a Gagliardo-Nirenberg inequality in ϕ-Triebel-Lizorkin spaces and derive key Sobolev estimates for the solution operator. These analyses yield the local and global well-posedness of the equations in appropriate Banach spaces. Our work demonstrates the effectiveness of the ϕ(-Δ)-framework for handling fractional dispersive equations with nonlocality.