Entropy of induced maps of regular curves homeomorphisms

Abstract

Let f:X X be a self homeomorphism of a continuum X, we show that the topological entropy of the induced system (2X,2f) is infinite provided that X (f) is not empty. If furthermore X is a regular curve then it is shown that (2X,2f) has infinite topological entropy if and only if X (f) is not empty. Moreover we prove for the induced system (C(X),C(f)) the equivalence between the following properties: (i) zero topological entropy; (ii) there is no Li-Yorke pair and (iii) for any periodic subcontinnum A of X and any connected component C of X (f), C⊂ A if A C≠ . In particular, the topological entropy of either (2X,2f) or (C(X),C(f)) has only two possible values 0 or ∞. At the end, we give an example of a pointwise periodic rational curve homeomorphism F:Y Y with infinite topological entropy induced map C(F).