Recurrence, pointwise almost periodicity and orbit closure relation for flows and foliations

Abstract

In this paper, we obtain a characterizations of the recurrence of a continuous vector field w of a closed connected surface M as follows. The following are equivalent: 1) w is pointwise recurrent. 2)w is pointwise almost periodic. 3) w is minimal or pointwise periodic. Moreover, if w is regular, then the following are equivalent: 1) w is pointwise recurrent. 2)w is minimal or the orbit space M/w is either [0,1], or S1. 3) R is closed (where R := \(x,y) ∈ M × M y ∈ O(x) \ is the orbit closure relation). On the other hand, we show that the following are equivalent for a codimension one foliation F on a compact manifold: 1) F is pointwise almost periodic. 2) F is minimal or compact. 3) F is R-closed. Also we show that if a foliated space on a compact metrizable space is either minimal or is both compact and without infinite holonomy, then it is R-closed.