Topological transitive sequence of cosine operators on Orlicz space

Abstract

For a Young function φ and a locally compact second countable group G, let Lφ(G) denote the Orlicz space on G. In this article, we present a necessary and sufficient condition for the topological transitivity of a sequence of cosine operators \Cn\n=1∞:=\12(Tng,w+Sng,w)\n=1∞, defined on Lφ(G). We investigate the conditions for a sequence of cosine operators to be topological mixing. Moreover, we go on to prove the similar results for the direct sum of a sequence of the cosine operators. At the last, an example of a topological transitive sequence of cosine operators is given.