2015
DOI: 10.1103/physreve.92.012132
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Equivalence of matrix product ensembles of trajectories in open quantum systems

Abstract: The equivalence of thermodynamic ensembles is at the heart of statistical mechanics and central to our understanding of equilibrium states of matter. Recently, it has been shown that there is a formal connection between the dynamics of open quantum systems and the statistical mechanics in an extra dimension. This is established through the fact that an open system dynamics generates a Matrix Product state (MPS) which encodes the set of all possible quantum jump trajectories and permits the construction of gene… Show more

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Cited by 22 publications
(43 citation statements)
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“…This approach is a classical version of the known connection between continuous MPSs and open quantum dynamics [11][12][13]. It allows to describe in a compact way conditioned trajectory ensembles and demonstrate ensemble equivalences, in analogy with what can be done in the quantum case [15,16]. The key property of cMPSs is that of gauge invariance from which the equivalences follow.…”
Section: Discussionmentioning
confidence: 99%
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“…This approach is a classical version of the known connection between continuous MPSs and open quantum dynamics [11][12][13]. It allows to describe in a compact way conditioned trajectory ensembles and demonstrate ensemble equivalences, in analogy with what can be done in the quantum case [15,16]. The key property of cMPSs is that of gauge invariance from which the equivalences follow.…”
Section: Discussionmentioning
confidence: 99%
“…This way of proving ensemble equivalence in terms of the distance between the corresponding cMPS vectors is the classical analog, for real vectors in an L1-space, of that of Ref. [16] for the case of quantum stochastic dynamics where the cMPS vectors are complex and belong to an L2-space (the systemoutput Hilbert space). A more detailed form of equivalence, termed operational equivalence in Ref.…”
Section: Equivalence Of Ensemblesmentioning
confidence: 99%
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