Abstract

The concept of a classical player, corresponding to a classical random variable, is extended to include quantum random variables in the form of self adjoint operators on infinite dimensional Hilbert space. A quantum version of Von Neumann's Minimax theorem for infinite dimensional (or continuous) games is proved.

Full Text
Paper version not known

Talk to us

Join us for a 30 min session where you can share your feedback and ask us any queries you have

Schedule a call

Similar Papers

Paper Title
Journal
Date
Author
The δ Equation on a Hilbert Space and Some Applications to Complex Analysis on Infinite Dimensional Vector Spaces
P Raboin
North-Holland Mathematics Studies | VOL. 34
P RaboinP Raboin
01 Jan 1979
Transition probabilities for non self-adjoint Hamiltonians in infinite dimensional Hilbert spaces
F Bagarello
Annals of Physics | VOL. 362
F BagarelloF Bagarello
14 Aug 2015
On the Equivalence of Minimax Theorems
Wen Song
Acta Mathematica Hungarica | VOL. 84
Wen SongWen Song
01 Jan 1998
Quantum Formulation of Classical Two Person Zero-Sum Games
Andreas Boukas
Open Systems and Information Dynamics | VOL. 7
Andreas BoukasAndreas Boukas
01 Jan 1999
View more papers

More From: Journal of Stochastic Analysis

Paper Title
Journal
Date
Author
Two Non�*�Isomorphic *�Lie Algebra Structures on sl(2,R) and Their Physical Origins
Luigi Accardi ... Yungang Lu
Journal of Stochastic Analysis | VOL. 4
Luigi Accardi, et. al.Luigi Accardi ... Yungang Lu
07 Feb 2024
Covariant Anyons via Mackey Machinery
Radhakrishnan Balu
Journal of Stochastic Analysis | VOL. 4
Radhakrishnan BaluRadhakrishnan Balu
25 Jan 2024
Nonlinear Filtering of Classical and Quantum Spin Systems
Sivaguru S Sritharan ... Saba Mudaliar
Journal of Stochastic Analysis | VOL. 4
Sivaguru S Sritharan, et. al.Sivaguru S Sritharan ... Saba Mudaliar
15 Jan 2024
On a Stationary Random Knot
Andrey A Dorogovtsev
Journal of Stochastic Analysis | VOL. 4
Andrey A DorogovtsevAndrey A Dorogovtsev
23 Oct 2023
View more papers

Disclaimer: All third-party content on this website/platform is and will remain the property of their respective owners and is provided on "as is" basis without any warranties, express or implied. Use of third-party content does not indicate any affiliation, sponsorship with or endorsement by them. Any references to third-party content is to identify the corresponding services and shall be considered fair use under The CopyrightLaw.