Floquet conformal field theories with generally deformed Hamiltonians

Ruihua Fan, Yingfei Gu, A. Vishwanath, X. Wen
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引用次数: 19

Abstract

In this work, we study non-equilibrium dynamics in Floquet conformal field theories (CFTs) in 1+1D, in which the driving Hamiltonian involves the energy-momentum density spatially modulated by an arbitrary smooth function. This generalizes earlier work which was restricted to the sine-square deformed type of Floquet Hamiltonians, operating within a $\mathfrak{sl}_2$ sub-algebra. Here we show remarkably that the problem remains soluble in this generalized case which involves the full Virasoro algebra, based on a geometrical approach. It is found that the phase diagram is determined by the stroboscopic trajectories of operator evolution. The presence/absence of spatial fixed points in the operator evolution indicates that the driven CFT is in a heating/non-heating phase, in which the entanglement entropy grows/oscillates in time. Additionally, the heating regime is further subdivided into a multitude of phases, with different entanglement patterns and spatial distribution of energy-momentum density, which are characterized by the number of spatial fixed points. Phase transitions between these different heating phases can be achieved simply by changing the duration of application of the driving Hamiltonian. We demonstrate the general features with concrete CFT examples and compare the results to lattice calculations and find remarkable agreement.
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具有一般变形哈密顿量的Floquet共形场论
本文研究了Floquet共形场理论(CFTs)在1+1D中的非平衡动力学,其中驱动哈密顿量涉及由任意光滑函数空间调制的能量-动量密度。这推广了先前的工作,这些工作仅限于在$\mathfrak{sl}_2$子代数中操作的正弦平方变形类型的Floquet hamilton。在这里,我们显著地表明,在这种基于几何方法的涉及完整Virasoro代数的广义情况下,问题仍然是可解的。发现相位图是由频闪算子演化轨迹决定的。算子演化中空间不动点的存在/不存在表明驱动CFT处于加热/非加热阶段,其中纠缠熵随时间增长/振荡。此外,加热状态进一步细分为多个阶段,具有不同的纠缠模式和能量-动量密度的空间分布,其特征是空间固定点的数量。这些不同加热阶段之间的相变可以简单地通过改变驱动哈密顿量的应用时间来实现。我们用具体的CFT例子证明了一般特征,并将结果与格计算进行了比较,发现了显著的一致性。
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