On Homoclinic points, Recurrences and Chain recurrences of volume-preserving diffeomorphisms without genericity

Abstract

Let M be a manifold with a volume form ω and f : M M be a diffeomorphism of class C1 that preserves ω. In this paper, we do not assume f is C1-generic. We have two main themes in the paper: (1) the chain recurrence; (2) relations among recurrence points, homoclinic points, shadowability and hyperbolicity. For (1) (without assuming M is compact), we have the theorem: if f is Lagrange stable, then M is a chain recurrent set. If M is compact, then the Lagrange-stability is automatic. For (2) (assuming the compactness of M), we prove some various implications among notions, such as: (i) the C1-stable shadowability equals to the hyperbolicity of M; (ii) if a point p∈ M has a recurrence point in the unstable manifold Wu (p, f) and there is no homoclinic point of p, then f is nonshadowable; (iii) if f has the shadowing property and p has a recurrence point in Wu (p, f), then the recurrent point is in the limit set of homoclinic points of p.