Vladimir Al. Osipov, Niclas Krieger, Thomas Guhr, Boris Gutkin
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引用次数: 0
摘要
我们考虑了 D 维晶格上被踢的双单元耦合映射中的局部相关性问题。我们证明,对于 D>=2,完全双单元系统表现出超局域相关性:具有局域支持的任何一对算子之间的相关性在有限的时间步数内消失。此外,对于 $D=2$,我们考虑了模型的部分双统一体系,即双统一性只适用于两个空间方向中的一个。对于这种情况,我们证明了相关性一般呈指数衰减,并提供了两个和四个相邻位点上支持的算子之间的相关函数的明确公式。
Local correlations in partially dual-unitary lattice models
We consider the problem of local correlations in the kicked, dual-unitary
coupled maps on D-dimensional lattices. We demonstrate that for D>=2, fully
dual-unitary systems exhibit ultra-local correlations: the correlations between
any pair of operators with local support vanish in a finite number of time
steps. In addition, for $D=2$, we consider the partially dual-unitary regime of
the model, where the dual-unitarity applies to only one of the two spatial
directions. For this case, we show that correlations generically decay
exponentially and provide an explicit formula for the correlation function
between the operators supported on two and four neighbouring sites.