Depth 0 Nonsingular Morse Smale flows on S3

Abstract

In this paper, we first develope the concept of Lyapunov graph to weighted Lyapunov graph (abbreviated as WLG) for nonsingular Morse-Smale flows (abbreviated as NMS flows) on S3. WLG is quite sensitive to NMS flows on S3. For instance, WLG detect the indexed links of NMS flows. Then we use WLG and some other tools to describe nonsingular Morse-Smale flows without heteroclinic trajectories connecting saddle orbits (abbreviated as depth 0 NMS flows). It mainly contains the following several directions: enumerate we use WLG to list depth 0 NMS flows on S3; with the help of WLG, comparing with Wada's algorithm, we provide a direct description about the (indexed) link of depth 0 NMS flows; to overcome the weakness that WLG can't decide topologically equivalent class, we give a simplified Umanskii Theorem to decide when two depth 0 NMS flows on S3 are topological equivalence; under these theories, we classify (up to topological equivalence) all depth 0 NMS flows on S3 with periodic orbits number no more than 4. enumerate