Universal scaling relationship between classical and quantum correlations in critical quantum spin chains
Abstract
We numerically investigate classical and quantum correlations in one-dimensional quantum critical systems. The infinite matrix product state (iMPS) representation is employed in order to consider an infinite-size spin chain. By using the infinite time-evolving block decimation algorithm, iMPS ground state wave functions are obtained at critical points for the transverse-field spin- XY model. From the ground state wave functions, we calculate classical and quantum correlations and mutual information. All of the correlations are found to exhibit a power-law decay with the increments of the lattice distance for both the transition lines of the Ising universality class and the Gaussian universality class. Such power-law scaling behaviors of the correlations manifest the existence of diversing correlation lengths, which means scale invariance. The critical features of the correlations can be characterized by introducing a critical exponent of the power-law decaying correlations. Similar to the critical exponent of the spin-spin correlation for the universality classes in the transverse-field XY model, we calculate the critical exponents of the two-spin classical and quantum correlations as well as that of the corresponding mutual information. All of the correlations have the same critical exponents, i.e., at a critical point, where the superscripts , , and stand for mutual information, classical correlation, and quantum correlation, respectively. Furthermore, the critical exponent of the spin-spin correlation is shown to relate to with .
Keywords
Cite
@article{arxiv.1805.03464,
title = {Universal scaling relationship between classical and quantum correlations in critical quantum spin chains},
author = {Yan-Wei Dai and Xi-Hao Chen and Sam Young Cho and Huan-Qiang Zhou and Dao-Xin Yao},
journal= {arXiv preprint arXiv:1805.03464},
year = {2018}
}
Comments
11 pages; 8 figures