Article ID | Journal | Published Year | Pages | File Type |
---|---|---|---|---|
4661165 | Topology and its Applications | 2007 | 6 Pages |
Abstract
Let G be a graph and be continuous. Denote by P(f), , ω(f) and Ω(f) the set of periodic points, the closure of the set of periodic points, ω-limit set and non-wandering set of f, respectively. In this paper we show that: (1) v∈ω(f) if and only if v∈P(f) or there exists an open arc L=(v,w) contained in some edge of G such that every open arc U=(v,c)⊂L contains at least 2 points of some trajectory; (2) v∈ω(f) if and only if every open neighborhood of v contains at least r+1 points of some trajectory, where r is the valence of v; (3) ; (4) if , then x has an infinite orbit.
Related Topics
Physical Sciences and Engineering
Mathematics
Geometry and Topology