Abstract
This article deals with the mathematical modeling of Tsallis entropy in fuzzy dynamical systems. At first, the concepts of Tsallis entropy and Tsallis conditional entropy of order where is a positive real number not equal to 1, of fuzzy partitions are introduced and their mathematical behavior is described. As an important result, we showed that the Tsallis entropy of fuzzy partitions of order satisfies the property of sub-additivity. This property permits the definition of the Tsallis entropy of order of a fuzzy dynamical system. It was shown that Tsallis entropy is an invariant under isomorphisms of fuzzy dynamical systems; thus, we acquired a tool for distinguishing some non-isomorphic fuzzy dynamical systems. Finally, we formulated a version of the Kolmogorov–Sinai theorem on generators for the case of the Tsallis entropy of a fuzzy dynamical system. The obtained results extend the results provided by Markechová and Riečan in Entropy, 2016, 18, 157, which are particularized to the case of logical entropy.
Subject
General Mathematics,Engineering (miscellaneous),Computer Science (miscellaneous)
Reference63 articles.
1. A new metric invariant of transitive dynamical systems and automorphisms of Lebesgue spaces;Kolmogorov;Dokl. Russ. Acad. Sci.,1958
2. On the notion of entropy of a dynamical system;Sinai;Dokl. Russ. Acad. Sci.,1959
3. A Mathematical Theory of Communication
4. CHARACTERISTIC LYAPUNOV EXPONENTS AND SMOOTH ERGODIC THEORY
5. Logical entropy of dynamical systems