A topological characterization for non-wandering surface flows

Abstract

Let v be a continuous flow with arbitrary singularities on a compact surface. Then we show that if v is non-wandering then v is topologically equivalent to a C∞ flow such that there are no exceptional orbits and P Sing(v) = \ x ∈ M ω(x) α(x) ⊂eq Sing(v) \, where P is the union of non-closed proper orbits and is the disjoint union symbol. Moreover, v is non-wandering if and only if LD Per(v) ⊃eq M - Sing(v), where LD is the union of locally dense orbits and A is the closure of a subset A ⊂eq M. On the other hand, v is topologically transitive if and only if v is non-wandering such that int(Per(v) Sing(v)) = and M - (P Sing(v)) is connected, where int A is the interior of a subset A ⊂eq M. In addition, we construct a smooth flow on T2 with P = LD =T2.