Dynamical Systems on Compact Metrizable Groups

Abstract

This paper is aim to extend Kenneth R. Berg's findings on the maximal entropy theorem and the ergodicity of measure convolution to the case of surjective homomorphisms. We further explores dynamical systems under surjective homomorphism in detail, especially the variation of entropy. Let G1 and G2 be compact metrizable groups, and suppose that G2 acts freely on G1 , the continuous mapping T1 and homomorphism T2 :G2 G2 satisfy T1 (yx)=T2 (y)T1 (x), where y∈ G2 , \; x∈ G1 . If μ 0 ∈ M(T0 ), μ 0 ' is the Haar extention of μ 0 , we proved that when μ ∈ M(T1 ,μ 0 ), the entropy h(T1 ,μ 0 ') \; is always greater than or equal to h(T1 ,μ ); if μ 0 ' is ergodic with respect to T1 , and the Haar measure m on G2 is ergodic with respect to T2 , and if h(T1 ,μ 0 ')<∞ , then the entropy h(T1 ,μ 0 ') \; is greater than h(T1 ,μ ). Finally, this paper also specifically discusses the ergodicity of the convolution of invariant measures. Let T be a surjective homomorphism on G, if (G,T, F,μ ) and(G,T, F, ) are disjoint ergodic dynamical systems, then μ * is ergodic. Via a proof by contradiction, the study demonstrates that the measure convolution of two disjoint ergodic dynamical systems can maintain ergodicity under the condition that Tis a surjective homomorphism on G.