States in generalized probabilistic models: An approach based in algebraic geometry
We present a characterization of states in generalized probabilistic models by appealing to a non-commutative version of geometric probability theory based on algebraic geometry techniques. Our theoretical framework allows for incorporation of invariant states in a natural way. © 2019 Mathematical I...
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Acceso en línea: | http://hdl.handle.net/20.500.12110/paper_01399918_v69_n1_p53_Massri |
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todo:paper_01399918_v69_n1_p53_Massri2023-10-03T14:58:12Z States in generalized probabilistic models: An approach based in algebraic geometry Massri, C. Holik, F. Plastino, A. algebraic geometry invariant states lattice theory non-commutative measure theory quantum probability quantum states We present a characterization of states in generalized probabilistic models by appealing to a non-commutative version of geometric probability theory based on algebraic geometry techniques. Our theoretical framework allows for incorporation of invariant states in a natural way. © 2019 Mathematical Institute Slovak Academy of Sciences. JOUR info:eu-repo/semantics/openAccess http://creativecommons.org/licenses/by/2.5/ar http://hdl.handle.net/20.500.12110/paper_01399918_v69_n1_p53_Massri |
institution |
Universidad de Buenos Aires |
institution_str |
I-28 |
repository_str |
R-134 |
collection |
Biblioteca Digital - Facultad de Ciencias Exactas y Naturales (UBA) |
topic |
algebraic geometry invariant states lattice theory non-commutative measure theory quantum probability quantum states |
spellingShingle |
algebraic geometry invariant states lattice theory non-commutative measure theory quantum probability quantum states Massri, C. Holik, F. Plastino, A. States in generalized probabilistic models: An approach based in algebraic geometry |
topic_facet |
algebraic geometry invariant states lattice theory non-commutative measure theory quantum probability quantum states |
description |
We present a characterization of states in generalized probabilistic models by appealing to a non-commutative version of geometric probability theory based on algebraic geometry techniques. Our theoretical framework allows for incorporation of invariant states in a natural way. © 2019 Mathematical Institute Slovak Academy of Sciences. |
format |
JOUR |
author |
Massri, C. Holik, F. Plastino, A. |
author_facet |
Massri, C. Holik, F. Plastino, A. |
author_sort |
Massri, C. |
title |
States in generalized probabilistic models: An approach based in algebraic geometry |
title_short |
States in generalized probabilistic models: An approach based in algebraic geometry |
title_full |
States in generalized probabilistic models: An approach based in algebraic geometry |
title_fullStr |
States in generalized probabilistic models: An approach based in algebraic geometry |
title_full_unstemmed |
States in generalized probabilistic models: An approach based in algebraic geometry |
title_sort |
states in generalized probabilistic models: an approach based in algebraic geometry |
url |
http://hdl.handle.net/20.500.12110/paper_01399918_v69_n1_p53_Massri |
work_keys_str_mv |
AT massric statesingeneralizedprobabilisticmodelsanapproachbasedinalgebraicgeometry AT holikf statesingeneralizedprobabilisticmodelsanapproachbasedinalgebraicgeometry AT plastinoa statesingeneralizedprobabilisticmodelsanapproachbasedinalgebraicgeometry |
_version_ |
1782029227654119424 |