On quantum Rényi entropies: A new generalization and some properties
- Department of Mathematics, ETH Zurich, 8092 Zürich (Switzerland)
- Department of Computer Science, Aarhus University, 8200 Aarhus (Denmark)
- Department of Mathematics, Technische Universität München, 85748 Garching (Germany)
- CWI (Centrum Wiskunde and Informatica), 1090 Amsterdam (Netherlands)
- Centre for Quantum Technologies, National University of Singapore, Singapore 117543 (Singapore)
The Rényi entropies constitute a family of information measures that generalizes the well-known Shannon entropy, inheriting many of its properties. They appear in the form of unconditional and conditional entropies, relative entropies, or mutual information, and have found many applications in information theory and beyond. Various generalizations of Rényi entropies to the quantum setting have been proposed, most prominently Petz's quasi-entropies and Renner's conditional min-, max-, and collision entropy. However, these quantum extensions are incompatible and thus unsatisfactory. We propose a new quantum generalization of the family of Rényi entropies that contains the von Neumann entropy, min-entropy, collision entropy, and the max-entropy as special cases, thus encompassing most quantum entropies in use today. We show several natural properties for this definition, including data-processing inequalities, a duality relation, and an entropic uncertainty relation.
- OSTI ID:
- 22251256
- Journal Information:
- Journal of Mathematical Physics, Vol. 54, Issue 12; Other Information: (c) 2013 AIP Publishing LLC; Country of input: International Atomic Energy Agency (IAEA); ISSN 0022-2488
- Country of Publication:
- United States
- Language:
- English
Similar Records
Relating different quantum generalizations of the conditional Rényi entropy
The smooth entropy formalism for von Neumann algebras