APPEL, Paul, Alexander J. HEILMAN, Ezekiel W. WERTZ, David W. LYONS, Marcus HUBER, Matej PIVOLUSKA a Giuseppe VITAGLIANO. Finite-Function-Encoding Quantum States. QUANTUM. WIEN: VEREIN FORDERUNG OPEN ACCESS PUBLIZIERENS QUANTENWISSENSCHAF, roč. 6, č. 708, s. 1-34. ISSN 2521-327X. doi:10.22331/q-2022-05-09-708. 2022.
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Základní údaje
Originální název Finite-Function-Encoding Quantum States
Autoři APPEL, Paul (276 Německo), Alexander J. HEILMAN, Ezekiel W. WERTZ, David W. LYONS, Marcus HUBER, Matej PIVOLUSKA (703 Slovensko, garant, domácí) a Giuseppe VITAGLIANO.
Vydání QUANTUM, WIEN, VEREIN FORDERUNG OPEN ACCESS PUBLIZIERENS QUANTENWISSENSCHAF, 2022, 2521-327X.
Další údaje
Originální jazyk angličtina
Typ výsledku Článek v odborném periodiku
Obor 10306 Optics
Stát vydavatele Rakousko
Utajení není předmětem státního či obchodního tajemství
WWW URL
Impakt faktor Impact factor: 6.400
Kód RIV RIV/00216224:14610/22:00125965
Organizační jednotka Ústav výpočetní techniky
Doi http://dx.doi.org/10.22331/q-2022-05-09-708
UT WoS 000799374500001
Klíčová slova anglicky non-locality; entanglement; high-dimensional quantum states
Štítky J-D1, J-Q1, rivok
Příznaky Mezinárodní význam, Recenzováno
Změnil Změnila: Mgr. Alena Mokrá, učo 362754. Změněno: 15. 3. 2023 18:14.
Anotace
We introduce finite-function-encoding (FFE) states which encode arbitrary d-valued logic functions, i.e., multivariate functions over the ring of integers modulo d, and investigate some of their structural properties. We also point out some differences between polynomial and non-polynomial function encoding states: The former can be associated to graphical objects, that we dub tensor-edge hypergraphs (TEH), which are a generalization of hypergraphs with a tensor attached to each hyperedge encoding the coefficients of the different monomials. To complete the framework, we also introduce a notion of finite-function-encoding Pauli (FP) operators, which correspond to elements of what is known as the generalized symmetric group in mathematics. First, using this machinery, we study the stabilizer group associated to FFE states and observe how qudit hypergraph states introduced in Ref. [1] admit stabilizers of a particularly simpler form. Afterwards, we investigate the classification of FFE states under local unitaries (LU), and, after showing the complexity of this problem, we focus on the case of bipartite states and especially on the classification under local FP operations (LFP). We find all LU and LFP classes for two qutrits and two ququarts and study several other special classes, pointing out the relation between maximally entangled FFE states and complex Butson-type Hadamard matrices. Our investigation showcases also the relation between the properties of FFE states, especially their LU classification, and the theory of finite rings over the integers.
Návaznosti
MUNI/G/1596/2019, interní kód MUNázev: Development of algorithms for application of quantum computers in electronic-structure calculations in solid-state physics and chemistry (Akronym: Qubits4PhysChem)
Investor: Masarykova univerzita, Development of algorithms for application of quantum computers in electronic-structure calculations in solid-state physics and chemistry, INTERDISCIPLINARY - Mezioborové výzkumné projekty
VytisknoutZobrazeno: 19. 4. 2024 05:22