Feynman–Kac perturbation of C∗ quantum stochastic flows

Alexander C.R. Belton; Stephen J. Wills

doi:10.1007/s13226-024-00648-7

Feynman–Kac perturbation of C∗ quantum stochastic flows

Alexander C.R. Belton
, Stephen J. Wills

School of Mathematical Sciences

University of Plymouth

Research output: Contribution to journal › Article › peer-review

Abstract

The method of Feynman–Kac perturbation of quantum stochastic processes has a long pedigree, with the theory usually developed within the framework of processes on von Neumann algebras. In this work, the theory of operator spaces is exploited to enable a broadening of the scope to flows on C^∗ algebras. Although the hypotheses that need to be verified in this general setting may seem numerous, we provide auxiliary results that enable this to be simplified in many of the cases which arise in practice. A wide variety of examples is provided by way of illustration.

Original language	English
Pages (from-to)	1062-1083
Number of pages	22
Journal	Indian Journal of Pure and Applied Mathematics
Volume	55
Issue number	3
DOIs	https://doi.org/10.1007/s13226-024-00648-7
Publication status	Published - Sep 2024

Keywords

Flows on universalC* algebras
Markovian cocycle
Multiplier equation
Quantum exclusion process
Quantum stochastic differential equation

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10.1007/s13226-024-00648-7

https://hdl.handle.net/10468/16175Licence: CC BY-NC-ND

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abstract = "The method of Feynman–Kac perturbation of quantum stochastic processes has a long pedigree, with the theory usually developed within the framework of processes on von Neumann algebras. In this work, the theory of operator spaces is exploited to enable a broadening of the scope to flows on C∗ algebras. Although the hypotheses that need to be verified in this general setting may seem numerous, we provide auxiliary results that enable this to be simplified in many of the cases which arise in practice. A wide variety of examples is provided by way of illustration.",

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N2 - The method of Feynman–Kac perturbation of quantum stochastic processes has a long pedigree, with the theory usually developed within the framework of processes on von Neumann algebras. In this work, the theory of operator spaces is exploited to enable a broadening of the scope to flows on C∗ algebras. Although the hypotheses that need to be verified in this general setting may seem numerous, we provide auxiliary results that enable this to be simplified in many of the cases which arise in practice. A wide variety of examples is provided by way of illustration.

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KW - Multiplier equation

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Feynman–Kac perturbation of C∗ quantum stochastic flows

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Keywords

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