The Loschmidt Spectral Form Factor
Abstract
The Spectral Form Factor (SFF) measures the fluctuations in the density of states of a Hamiltonian. We consider a generalization of the SFF called the Loschmidt Spectral Form Factor, , for small. If the ensemble average of the SFF is the variance of the density fluctuations for a single Hamiltonian drawn from the ensemble, the averaged Loschmidt SFF is the covariance for two Hamiltonians drawn from a correlated ensemble. This object is a time-domain version of the parametric correlations studied in the quantum chaos and random matrix literatures. We show analytically that the averaged Loschmidt SFF is proportional to for a complex rate with a positive imaginary part, showing in a quantitative way that the long-time details of the spectrum are exponentially more sensitive to perturbations than the short-time properties. We calculate in a number of cases, including random matrix theory, theories with a single localized defect, and hydrodynamic theories.
Keywords
Cite
@article{arxiv.2206.00677,
title = {The Loschmidt Spectral Form Factor},
author = {Michael Winer and Brian Swingle},
journal= {arXiv preprint arXiv:2206.00677},
year = {2022}
}
Comments
16 pages, comments welcome