Nonautonomous Dynamical Systems II: Variational Principles

Abstract

Let X=\Xk\k=0∞ be a sequence of compact metric spaces Xk and T=\Tk\k=0∞ a sequence of continuous mappings Tk: Xk Xk+1. The pair (X,T) is called a nonautonomous dynamical system. In this paper, we study measure-theoretic entropies and pressures, Bowen and packing topological entropies and pressures on (X,T), and we prove that they are invariant under equiconjugacies of nonautonomous dynamical systems. By establishing Billingsley type theorems for Bowen and packing topological pressures, we obtain their variational principles, that is, given a non-empty compact subset K ⊂ X0 and an equicontinuous sequence f= \fk\k=0∞ of functions fk : Xk R, we have that PB(T,f,K)=\Pμ(T,f): μ ∈ M(X0), μ(K)=1\, and for \|f\|<+∞ and PP(T,f,K)>\|f\|, PP(T,f,K)=\Pμ(T,f): μ ∈ M(X0), μ(K)=1\, where Pμ and Pμ , PB and PP denote measure-theoretic lower and upper pressures, Bowen and packing topological pressure, respectively. The Billingsley type theorems and variational principles for Bowen and packing topological entropies are direct consequences of the ones for Bowen and packing topological pressures.

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