1301.0855 (Alexey E. Rastegin)
Alexey E. Rastegin
A general tool for description of open quantum systems is given by the formalism of quantum operations. Most important of them are trace-preserving maps also known as quantum channels. We discuss those conditions on quantum channels that the Jarzynski equality and related fluctuation theorems hold. It is essential that the representing quantum channel be unital. Under the mentioned condition, we first derive the corresponding Jarzynski equality. For bistochastic map and its adjoint, we further formulate a theorem of Tasaki--Crooks type. In the context of unital channels, some notes on heat transfer between two quantum systems are given. We also consider a finite quantum system operated by an external agent with a feedback control. When unital channels are applied at the first stage and, for a mutual-information form, at the further ones, we obtain quantum Jarzynski--Sagawa--Ueda relations. These are extension of the previously given results to unital quantum operations.
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http://arxiv.org/abs/1301.0855
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