Morse-Smale systems without heteroclinic submanifolds on codimension one separatrices

Abstract

We study a topological structure of a closed n-manifold Mn (n≥ 3) which admits a Morse-Smale diffeomorphism such that codimension one separatrices of saddles periodic points have no heteroclinic intersections different from heteroclinic points. Also we consider gradient like flow on Mn such that codimension one separatices of saddle singularities have no intersection at all. We show that Mn is either an n-sphere Sn, or the connected sum of a finite number of copies of Sn-1 S1 and a finite number of special manifolds Nni admitting polar Morse-Smale systems. Moreover, if some Nni contains a single saddle, then Nni is projective-like (in particular, n∈\4,8,16\, and Nni is a simply-connected and orientable manifold). Given input dynamical data, one constructs a supporting manifold Mn. We give a formula relating the number of sinks, sources and saddle periodic points to the connected sum for Mn. As a consequence, we obtain conditions for the existence of heteroclinic intersections for Morse-Smale diffeomorphisms and a periodic trajectory for Morse-Smale flows.