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Paper detail

Transformations on density operators and on positive definite operators preserving the quantum Rényi divergence

In a certain sense we generalize the recently introduced and extensively studied notion called quantum Rényi divergence (in another name, sandwiched Rényi relative entropy) and describe the structures of corresponding symmetries. More precisely, we characterize all transformations on the set of density operators which leave our new general quantity invariant and also determine the structure of all bijective transformations on the cone of positive definite operators which preserve the quantum Rényi divergence.

preprint2015arXivOpen access
Marcell GaálLajos Molnár
math-phmath.FAmath.MPquant-ph
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Marcell GaálLajos Molnár

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