Results 51 to 60 of about 1,569 (137)

Hilbert Lattice Equations

, 2010
There are five known classes of lattice equations that hold in every infinite dimensional Hilbert space underlying quantum systems: generalised orthoarguesian, Mayet's E_A, Godowski, Mayet-Godowski, and Mayet's E equations. We obtain a result which opens
A.R. Swift, B.D. McKay, B.O. Hultgren III, E.G. Beltrametti, F. Maeda, G. Kalmbach, G. Kalmbach, G. Kalmbach, J.J. Zeman, L. Beran, M. Navara, M. Pavičić, M. Pavičić, M. Pavičić, M. Pavičić, M.J. Ma̧czyński, M.P. Solèr, Mladen Pavičić, N.D. Megill, Norman D. Megill, P. Jipsen, P. Pták, P.-A. Ivert, R. Godowski, R. Jajte, R. Mayet, R. Mayet, R. Mayet, R. Mayet, S.S. Holland Jr   +29 more
core   +1 more source

Between quantum logic and concurrency

, 2014
We start from two closure operators defined on the elements of a special kind of partially ordered sets, called causal nets. Causal nets are used to model histories of concurrent processes, recording occurrences of local states and of events.
Bernardinello, Luca, Ferigato, Carlo, Pomello, Lucia   +2 more
core   +2 more sources

Sharply Orthocomplete Effect Algebras [PDF]

, 2010
Special types of effect algebras $E$ called sharply dominating and S-dominating were introduced by S. Gudder in \cite{gudder1,gudder2}. We prove statements about connections between sharp orthocompleteness, sharp dominancy and completeness of $E$. Namely
Kalina, Martin, Paseka, Jan, Riečanová, Zdenka   +2 more
core   +3 more sources

Pattern Recognition In Non-Kolmogorovian Structures

, 2017
We present a generalization of the problem of pattern recognition to arbitrary probabilistic models. This version deals with the problem of recognizing an individual pattern among a family of different species or classes of objects which obey ...
Freytes, Hector, Holik, Federico, Plastino, Angelo, Sergioli, Giuseppe   +3 more
core   +1 more source

Two Remarks to Bifullness of Centers of Archimedean Atomic Lattice Effect Algebras

Acta Polytechnica, 2011
Lattice effect algebras generalize orthomodular lattices as well as MV-algebras. This means that within lattice effect algebras it is possible to model such effects as unsharpness (fuzziness) and/or non-compatibility. The main problem is the existence of
M. Kalina
doaj  

Orthomodular lattices admitting no states [PDF]

Journal of Combinatorial Theory, Series A, 1971
AbstractThe purpose of this paper is to construct a class of orthomodular lattices which admit no bounded measures.
openaire   +1 more source

Noncommmutative theorems: Gelfand Duality, Spectral, Invariant Subspace, and Pontryagin Duality [PDF]

, 2005
We extend the Gelfand-Naimark duality of commutative C*-algebras, "A COMMUTATIVE C*-ALGEBRA -- A LOCALLY COMPACT HAUSDORFF SPACE" to "A C*-ALGEBRA--A QUOTIENT OF A LOCALLY COMPACT HAUSDORFF SPACE".
Patel, Mukul S.
core  

Automorphism groups of orthomodular lattices [PDF]

Bulletin of the Australian Mathematical Society, 1984
Every group is the automorphism group of an orthomodular lattice.
openaire   +2 more sources

Generalized XOR Operation and the Categorical Equivalence of the Abbott Algebras and Quantum Logics. [PDF]

Int J Theor Phys (Dordr), 2023
Burešová D.
europepmc   +1 more source

Connecting the free energy principle with quantum cognition. [PDF]

Front Neurorobot, 2022
Gunji YP, Shinohara S, Basios V.
europepmc   +1 more source