Topological entropy of diagonal maps on inverse limit spaces
Abstract
We give an upper bound for the topological entropy of maps on inverse limit spaces in terms of their set-valued components. In a special case of a diagonal map on the inverse limit space (I,f), where every diagonal component is the same map g I I which strongly commutes with f (i.e. f-1 g=g f-1), we show that the entropy equals \Ent(f),Ent(g)\. As a side product, we develop some techniques for computing topological entropy of set-valued maps.
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