Related papers: Dynamical relaxation of a long-range XY chain

Dynamical relaxation of a long-range XY chain

URL: http://arxiv.org/abs/2311.18293v2
Date: Sun, 3 Dec 2023 13:32:58 GMT
Title: Dynamical relaxation of a long-range XY chain
Authors: Yu-Huang Huang, Yin-Tao Zou, and Chengxiang Ding
Abstract summary: We study the universal real-time relaxation behaviors of a long-range quantum XY chain following a quench. In the case of noncritical quench, neither the initial state nor the postquench Hamiltonian is at a critical point of equilibrium phase transition. For the critical quench, the initial state or the postquench Hamiltonian is at a critical point of equilibrium phase transition.
Score: 0.0
License: http://creativecommons.org/licenses/by/4.0/
Abstract: We study the universal real-time relaxation behaviors of a long-range quantum XY chain following a quench. Our research includes both the noncritical and critical quench. In the case of noncritical quench, i.e., neither the initial state nor the postquench Hamiltonian is at a critical point of equilibrium phase transition, a quench to the commensurate phase or incommensurate phase gives a scaling of $t^{-3/2}$ or $t^{-1/2}$, respectively, which is the same as the counterpart of the short-range XY model. However, for a quench to the boundary line between the commensurate and incommensurate phases, the scaling law $t^{-\mu}$ may be different from the $t^{-3/4}$ law of the counterpart of the short-range model. More interestingly, the decaying exponent $\mu$ may depend on the choice of the parameters of the postquench Hamiltonian because of the different asymptotic behaviors of the energy spectrum. Furthermore, in certain cases, the scaling behavior may be outside the range of predictions made by the stationary phase approximation, because an inflection point emerges in the energy spectrum. For the critical quench, i.e., the initial state or the postquench Hamiltonian is at a critical point of equilibrium phase transition, the aforementioned scaling law $t^{-\mu}$ may be changed because of the gap-closing property of the energy spectrum of the critical point.

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