Fractional Statistics and the Butterfly Effect
Abstract
Fractional statistics and quantum chaos are both phenomena associated with the non-local storage of quantum information. In this article, we point out a connection between the butterfly effect in (1+1)-dimensional rational conformal field theories and fractional statistics in (2+1)-dimensional topologically ordered states. This connection comes from the characterization of the butterfly effect by the out-of-time-order-correlator proposed recently. We show that the late-time behavior of such correlators is determined by universal properties of the rational conformal field theory such as the modular S-matrix and conformal spins. Using the bulk-boundary correspondence between rational conformal field theories and (2+1)-dimensional topologically ordered states, we show that the late time behavior of out-of-time-order-correlators is intrinsically connected with fractional statistics in the topological order. We also propose a quantitative measure of chaos in a rational conformal field theory, which turns out to be determined by the topological entanglement entropy of the corresponding topological order.
Keywords
Cite
@article{arxiv.1602.06543,
title = {Fractional Statistics and the Butterfly Effect},
author = {Yingfei Gu and Xiao-Liang Qi},
journal= {arXiv preprint arXiv:1602.06543},
year = {2016}
}
Comments
Published version, 1+25 pages, 10 figures