Related papers: Exponential tail estimates for quantum lattice dynamics

Exponential tail estimates for quantum lattice dynamics

URL: http://arxiv.org/abs/2408.02108v1
Date: Sun, 4 Aug 2024 18:35:36 GMT
Title: Exponential tail estimates for quantum lattice dynamics
Authors: Christopher Cedzich, Alain Joye, Albert H. Werner, Reinhard F. Werner,
Abstract summary: We consider the quantum dynamics of a particle on a lattice for large times. We show that the total probability of strictly outside the support of the measure goes to zero exponentially with $t$.
Score: 1.2499537119440245
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: We consider the quantum dynamics of a particle on a lattice for large times. Assuming translation invariance, and either discrete or continuous time parameter, the distribution of the ballistically scaled position $Q(t)/t$ converges weakly to a distribution that is compactly supported in velocity space, essentially the distribution of group velocity in the initial state. We show that the total probability of velocities strictly outside the support of the asymptotic measure goes to zero exponentially with $t$, and we provide a simple method to estimate the exponential rate uniformly in the initial state. Near the boundary of the allowed region the rate function goes to zero like the power 3/2 of the distance to the boundary. The method is illustrated in several examples.

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