Related papers: Dark Subspaces and Invariant Measures of Quantum Trajectories

Dark Subspaces and Invariant Measures of Quantum Trajectories

URL: http://arxiv.org/abs/2409.18655v1
Date: Fri, 27 Sep 2024 11:39:25 GMT
Title: Dark Subspaces and Invariant Measures of Quantum Trajectories
Authors: Tristan Benoist, Clément Pellegrini, Anna Szczepanek,
Abstract summary: Quantum trajectories are Markov processes describing the evolution of a quantum system. We prove a Markov process on some linear subspaces called dark subspaces, defined in (Maassen, K"ummerer 2006) Using a notion of minimal family of isometries from a reference space to dark subspaces, we prove a set of measures indexed by orbits of a unitary group is the set of ergodic measures of quantum trajectories.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: Quantum trajectories are Markov processes describing the evolution of a quantum system subject to indirect measurements. They can be viewed as place dependent iterated function systems or the result of products of dependent and non identically distributed random matrices. In this article, we establish a complete classification of their invariant measures. The classification is done in two steps. First, we prove a Markov process on some linear subspaces called dark subspaces, defined in (Maassen, K\"ummerer 2006), admits a unique invariant measure. Second, we study the process inside the dark subspaces. Using a notion of minimal family of isometries from a reference space to dark subspaces, we prove a set of measures indexed by orbits of a unitary group is the set of ergodic measures of quantum trajectories.

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