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Non-abelian Weyl commutation relations and the series product of quantum stochastic evolutions

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Authors

Evans, D. Gwion
Gough, J.E.
James, Matthew

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Royal Society of London

Abstract

We show that the series product, which serves as an algebraic rule for connecting state-based input-output systems, is intimately related to the Heisenberg group and the canonical commutation relations. The series product for quantum stochastic models then corresponds to a non-abelian generalization of the Weyl commutation relation. We show that the series product gives the general rule for combining the generators of quantum stochastic evolutions using a Lie-Trotter product formula.

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Philosophical Transactions of the Royal Society Series A

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Restricted until

2037-12-31