Related papers: One-dimensional Continuous-Time Quantum Markov Chains: qubit probabilities and measures

One-dimensional Continuous-Time Quantum Markov Chains: qubit probabilities and measures

URL: http://arxiv.org/abs/2402.15878v1
Date: Sat, 24 Feb 2024 18:02:41 GMT
Title: One-dimensional Continuous-Time Quantum Markov Chains: qubit probabilities and measures
Authors: Manuel D. De la Iglesia, Carlos F. Lardizabal
Abstract summary: We study continuous-time QMCs on the integer line, half-line and finite segments. We are able to obtain exact probability calculations in terms of the associated matrix-valueds and measures.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: Quantum Markov chains (QMCs) are positive maps on a trace-class space describing open quantum dynamics on graphs. Such objects have a statistical resemblance with classical random walks, while at the same time it allows for internal (quantum) degrees of freedom. In this work we study continuous-time QMCs on the integer line, half-line and finite segments, so that we are able to obtain exact probability calculations in terms of the associated matrix-valued orthogonal polynomials and measures. The methods employed here are applicable to a wide range of settings, but we will restrict to classes of examples for which the Lindblad generators are induced by a single positive map, and such that the Stieltjes transforms of the measures and their inverses can be calculated explicitly.

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