Time-symmetric correlations for open quantum systems
Abstract
Two-time expectation values of sequential measurements of dichotomic observables are known to be time symmetric for closed quantum systems. Namely, if a system evolves unitarily between sequential measurements of dichotomic observables OA followed by OB, then it necessarily follows that OA\,,OB=OB\,,OA, where OA\,,OB is the two-time expectation value corresponding to the product of the measurement outcomes of OA followed by OB, and OB\,,OA is the two-time expectation value associated with the time reversal of the unitary dynamics, where a measurement of OB precedes a measurement of OA. In this work, we show that a quantum Bayes' rule implies a time symmetry for two-time expectation values associated with open quantum systems, which evolve according to a general quantum channel between measurements. Such results are in contrast with the view that processes associated with open quantum systems -- which may lose information to their environment -- are not reversible in any operational sense. We give an example of such time-symmetric correlations for the amplitude-damping channel, and we propose an experimental protocol for the potential verification of the theoretical predictions associated with our results.
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