Li-Yorke chaos for dendrite maps with zero topological entropy and ω-limit sets

Abstract

Let X be a dendrite with set of endpoints E(X) closed and let f:~X X be a continuous map with zero topological entropy. Let P(f) be the set of periodic points of f. We prove that if L is an infinite ω-limit set of f then L P(f)⊂ E(X), where E(X) is the set of all accumulations points of E(X). Furthermore, if E(X) is countable and L is uncountable then L P(f)=. We also show that if E(X) is finite then any uncountable ω-limit set of f has a decomposition and as a consequence if f has a Li-Yorke pair (x,y) with ω\f(x) or ω\f(y) is uncountable then f is Li-Yorke chaotic.