Commuting elements in non-commutative algebras associated to dynamical systems

Persson, Tomas; Silvestrov, Sergei (2003). Commuting elements in non-commutative algebras associated to dynamical systems. Khrennikov, Andrei (Ed.). Series: Mathematical Modelling in Physics, Engineering and Cognitive Science, 6,, 145 - 172. Workshop Dynamical Systems from Number Theory to Probability 2. Växjö University, Växjö, Sweden: Växjö University Press

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Conference Proceeding/Paper | Published | English

Authors:

Persson, Tomas ; Silvestrov, Sergei

Editors:

Khrennikov, Andrei

Department:

Mathematics (Faculty of Engineering)
Non-commutative Geometry-lup-obsolete
Dynamical systems

Project:

Non-commutative Analysis of Dynamics, Fractals and Wavelets

Research Group:

Non-commutative Geometry-lup-obsolete
Dynamical systems

Abstract:
In this article the problem of explicit description of commuting functions of noncommuting elements satisfying commutation relation of the form AB = BF(A) is considered and connection to periodic points of corresponding dynamical system is established.

ISBN:

91-7636-386-4

LUP-ID:

9e47a098-091c-4051-8203-a8fb45b9b12c | Link: https://lup.lub.lu.se/record/9e47a098-091c-4051-8203-a8fb45b9b12c | Statistics

Commuting elements in non-commutative algebras associated to dynamical systems

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