We find the structure of generators of norm continuous quantum Markov semigroups on B(h) that are symmetric with respect to the scalar product $tr (\rho^{1/2}x\rho^{1/2}y)$ induced by a faithful normal invariant state $\rho$ and satisfy two quantum generalisations of the classical detailed balance condition related with this non-commutative notion of symmetry: the so-called standard detailed balance condition and the standard detailed balance condition with an antiunitary time reversal.
Generators of KMS Symmetric Quantum Markov Semigroups and Detailed Balance
UMANITA', VERONICA
2010-01-01
Abstract
We find the structure of generators of norm continuous quantum Markov semigroups on B(h) that are symmetric with respect to the scalar product $tr (\rho^{1/2}x\rho^{1/2}y)$ induced by a faithful normal invariant state $\rho$ and satisfy two quantum generalisations of the classical detailed balance condition related with this non-commutative notion of symmetry: the so-called standard detailed balance condition and the standard detailed balance condition with an antiunitary time reversal.
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