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Autores principales: Popp, Christopher, Sutter, Tobias C., Hiesmayr, Beatrix C.
Formato: Preprint
Publicado: 2025
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Acceso en línea:https://arxiv.org/abs/2509.04079
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author Popp, Christopher
Sutter, Tobias C.
Hiesmayr, Beatrix C.
author_facet Popp, Christopher
Sutter, Tobias C.
Hiesmayr, Beatrix C.
contents Quantum information quantities, such as mutual information and entropies, are essential for characterizing quantum systems and protocols in quantum information science. In this contribution, we identify types of information measures based on generalized divergences and prove their invariance under local isometric or unitary transformations. Leveraging the reversal channel for local isometries together with the data processing inequality, we establish invariance for information quantities used in both asymptotic and one-shot regimes without relying on the specific functional form of the underlying divergence. These invariances can be applied to improve the computation of such information quantities or optimize protocols and their output states whose performance is determined by some invariant measure. Our results improve the capability to characterize and compute many operationally relevant information measures with application across the field of quantum information processing.
format Preprint
id arxiv_https___arxiv_org_abs_2509_04079
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Local Invariance of Divergence-based Quantum Information Measures
Popp, Christopher
Sutter, Tobias C.
Hiesmayr, Beatrix C.
Quantum Physics
Quantum information quantities, such as mutual information and entropies, are essential for characterizing quantum systems and protocols in quantum information science. In this contribution, we identify types of information measures based on generalized divergences and prove their invariance under local isometric or unitary transformations. Leveraging the reversal channel for local isometries together with the data processing inequality, we establish invariance for information quantities used in both asymptotic and one-shot regimes without relying on the specific functional form of the underlying divergence. These invariances can be applied to improve the computation of such information quantities or optimize protocols and their output states whose performance is determined by some invariant measure. Our results improve the capability to characterize and compute many operationally relevant information measures with application across the field of quantum information processing.
title Local Invariance of Divergence-based Quantum Information Measures
topic Quantum Physics
url https://arxiv.org/abs/2509.04079