Extended orbit properties on surfaces

Abstract

In this paper, we study "demi-caract\'eristique" and (Poisson) stability in the sense of Poincar\'e. Using the definitions \'a la Poincar\'e for -actions v on compact connected surfaces, we show that "R-closed" ⇒ "pointwise almost periodicity (p.a.p.)" ⇒ "recurrence" ⇒ non-wandering. Moreover, we show that the action v is "recurrence" with |Sing(v)| < ∞ iff v is regular non-wandering. If there are no locally dense orbits, then v is "p.a.p." iff v is "recurrence" without "orbits" containing infinitely singularities. If |Sing(v)| < ∞, then v is "R-closed" iff v is "p.a.p.".