Maximal regularity for time-fractional Schr\"odinger equations and application to nonlinear equations

Abstract

We study the maximal regularity problem for abstract time-fractional Schr\"odinger equations ∂tα(u-u0) -i A u=f, with a fractional derivative ∂tα of order α ∈ (0,1). We assume that A is a self-adjoint operator with compact resolvent on a Hilbert space H. First, we prove the maximal L2-regularity by leveraging properties of Mittag-Leffler functions with an imaginary argument. Compared to existing results for the subdiffusion equations, our proof avoids using the complete monotonicity of Mittag-Leffler functions, which seems difficult to prove within the setting of an imaginary argument. Then, we prove the maximal Lp-regularity for p∈ (1,∞) using the operator-valued version of Mikhlin's multiplier theorem. Finally, we apply the maximal regularity results to prove the local well-posedness of quasilinear and semilinear time-fractional Schr\"odinger equations.

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