Abstract
Many quantum information theoretic quantities are similar to and/or inspired by thermodynamic quantities, with entanglement entropy being a well-known example. In this paper, we study a less well-known example, capacity of entanglement, which is the quantum information theoretic counterpart of heat capacity. It can be defined as the second cumulant of the entanglement spectrum and can be loosely thought of as the variance in the entanglement entropy. We review the definition of capacity of entanglement and its relation to various other quantities such as fidelity susceptibility and Fisher information. We then calculate the capacity of entanglement for various quantum systems, conformal and non-conformal quantum field theories in various dimensions, and examine their holographic gravity duals. Resembling the relation between response coefficients and order parameter fluctuations in Landau-Ginzburg theories, the capacity of entanglement in field theory is related to integrated gravity fluctuations in the bulk. We address the question of measurability, in the context of proposals to measure entanglement and R\'enyi entropies by relating them to $U(1)$ charges fluctuating in and out of a subregion, for systems equivalent to non-interacting fermions. From our analysis, we find universal features in conformal field theories, in particular the area dependence of the capacity of entanglement appears to track that of the entanglement entropy. This relation is seen to be modified under perturbations from conformal invariance. In quenched 1+1 dimensional CFTs, we compute the rate of growth of the capacity of entanglement. The result may be used to refine the interpretation of entanglement spreading being carried by ballistic propagation of entangled quasiparticle pairs created at the quench.
Highlights
Entanglement entropy has been proven quite useful as a diagnostic of topological properties of ground states of quantum many-body systems, for a recent review see e.g., [1]
We review the definition of capacity of entanglement and its relation to various other quantities such as fidelity susceptibility and Fisher information
We only considered the leading term of the Renyi entropy in terms of a cutoff, one can in principle do more precise computations taking the exact cutoff dependence into account [13,16], but that is beyond the scope of this paper
Summary
Entanglement entropy has been proven quite useful as a diagnostic of topological properties of ground states of quantum many-body systems, for a recent review see e.g., [1]. For systems of with a gravity dual, higher cumulants capture the whole series of the quantum gravitational fluctuations about the RT surface, giving the complete entanglement spectrum or the Renyi/ modular entropies. In four-dimensional conformal field theories, in a fairly natural regularization scheme, the ratio between the coefficients in front of the area term in entanglement entropy and capacity of entanglement turns out to be precisely a=c, the ratio of the a and c anomaly coefficients, for spherical entangling surfaces This area law suggests that most of the quantum fluctuations of the RT surface are located near the boundary of AdS and this does not seem to shed much light on the size of local bulk quantum fluctuations.
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