Graph-Theoretic Analysis of n-Replica Time Evolution in the Brownian Gaussian Unitary Ensemble
Abstract
In this paper, we investigate the n-replica time evolution operator Un(t) eLnt for the Brownian Gaussian Unitary Ensemble (BGUE) using a graph-theoretic approach. We examine the moments of the generating operator Ln, which governs the Euclidean time evolution within an auxiliary D2n-dimensional Hilbert space, where D represents the dimension of the Hilbert space for the original system. Explicit representations for the cases of n = 2 and n = 3 are derived, emphasizing the role of graph categorization in simplifying calculations. Furthermore, we present a general approach to streamline the calculation of time evolution for arbitrary n, supported by a detailed example of n = 4. Our results demonstrate that the n-replica framework not only facilitates the evaluation of various observables but also provides valuable insights into the relationship between Brownian disordered systems and quantum information theory.
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