Weighted Topological Entropy of Random Dynamical Systems
Abstract
Let fi,i=1,2 be continuous bundle random dynamical systems over an ergodic compact metric system (,F,P,). Assume that a=(a1,a2)∈R2 with a1>0 and a2≥0, f2 is a factor of f1 with a factor map :× X1→× X2. We define the a-weighted Bowen topological entropy of h a(ω,f1,X1) of f1 with respect to ω∈ . It is shown that the quality h a(ω,f1,X1) is measurable in , and denoted that h a(f1,× X1) is the integration of h a(ω,f1,X1) against P. We prove the following variational principle: align* h a(f1,× X1)=\a1hμ(r)(f1)+a2hμ-1(r)(f2)\, align* where the supremum is taken over the set of all μ∈MP1(× X1,f1). In the case of random dynamical systems with an ergodic and compact driving system, this gives an affirmative answer to the question posed by Feng and Huang [Variational principle for weighted topological pressure, J. Math. Pures Appl. 106 (2016), 411-452]. It also generalizes the relativized variational principle for fiber topological entropy, and provides a topological extension of Hausdorff dimension of invariant sets and random measures on the 2-torus T2. In addition, the Shannon-McMillan-Breiman theorem, Brin-Katok local entropy formula and Katok entropy formula of weighted measure-theoretic entropy for random dynamical systems are also established in this paper.
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