Related papers: Ergodic Theorems for Quantum Trajectories under Disordered Generalized Measurements

Ergodic Theorems for Quantum Trajectories under Disordered Generalized Measurements

URL: http://arxiv.org/abs/2501.18014v1
Date: Wed, 29 Jan 2025 22:04:20 GMT
Title: Ergodic Theorems for Quantum Trajectories under Disordered Generalized Measurements
Authors: Owen Ekblad, Eloy Moreno-Nadales, Lubashan Pathirana,
Abstract summary: We consider quantum trajectories arising from disordered, repeated generalized measurements. We establish a strong law of large numbers for measurement outcomes arising from disordered quantum trajectories.
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Abstract: We consider quantum trajectories arising from disordered, repeated generalized measurements, which have the structure of Markov chains in random environments (MCRE) with dynamically-defined transition probabilities; we call these disordered quantum trajectories. Under the assumption that the underlying disordered open quantum dynamical system approaches a unique equilibrium in time averages, we establish a strong law of large numbers for measurement outcomes arising from disordered quantum trajectories, which follows after we establish general annealed ergodic theorems for the corresponding MCRE. The type of disorder our model allows includes the random settings where the disorder is i.i.d. or Markovian, the periodic (resp. quasiperiodic) settings where the disorder has periodic (resp. quasiperiodic) structure, and the nonrandom setting where the disorder is constant through time. In particular, our work extends the earlier noise-free results of K\"ummerer and Maassen to the present disordered framework.

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