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Main Author: Siudzińska, Katarzyna
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2404.02034
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author Siudzińska, Katarzyna
author_facet Siudzińska, Katarzyna
contents We introduce a generalization of symmetric measurements to collections of unequinumerous positive, operator-valued measures (POVMs). For informationally complete sets, we propose construction methods from orthonormal Hermitian operator bases. The correspondence between operator bases and measurements can be as high as four-to-four, with a one-to-one correspondence following only under additional assumptions. Importantly, it turns out that some of the symmetry properties, lost in the process of generalization, can be recovered without fixing the same number of elements for all POVMs. In particular, for a wide class of unequinumerous symmetric measurements that are conical 2-designs, we derive the index of coincidence, entropic uncertainty relations, and separability criteria for bipartite quantum states.
format Preprint
id arxiv_https___arxiv_org_abs_2404_02034
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle How much symmetry do symmetric measurements need for efficient operational applications?
Siudzińska, Katarzyna
Quantum Physics
Mathematical Physics
We introduce a generalization of symmetric measurements to collections of unequinumerous positive, operator-valued measures (POVMs). For informationally complete sets, we propose construction methods from orthonormal Hermitian operator bases. The correspondence between operator bases and measurements can be as high as four-to-four, with a one-to-one correspondence following only under additional assumptions. Importantly, it turns out that some of the symmetry properties, lost in the process of generalization, can be recovered without fixing the same number of elements for all POVMs. In particular, for a wide class of unequinumerous symmetric measurements that are conical 2-designs, we derive the index of coincidence, entropic uncertainty relations, and separability criteria for bipartite quantum states.
title How much symmetry do symmetric measurements need for efficient operational applications?
topic Quantum Physics
Mathematical Physics
url https://arxiv.org/abs/2404.02034