Spectral localization estimates for abstract linear Schr\"odinger equations

Abstract

We study the propagation properties of abstract linear Schr\"odinger equations of the form i∂t = H0+V(t), where H0 is a self-adjoint operator and V(t) a time-dependent potential. We present explicit sufficient conditions ensuring that if the initial state 0 has spectral support in (-∞,0] with respect to a reference self-adjoint operator φ, then, for some c>0 independent of 0 and all t0, the solution t remains spectrally supported in (-∞,c|t|] with respect to φ, up to an O(|t|-n) remainder in norm. The main condition is that the multiple commutators of H0 and φ are uniformly bounded in operator norm up to the (n+1)-th order. We then apply the abstract theory to a class of nonlocal Schr\"odinger equations on Rd, proving that any solution with compactly supported initial state remains approximately supported, up to a polynomially suppressed tail in L2-norm, inside a linearly spreading region around the initial support for all t0.