Morse index of saddle equilibria of gradient-like flows on connected sums of Sn-1× S1

Abstract

Let M be either n-sphere Sn or a connected sum of finitely many copies of Sn-1× S1, n≥4. A flow ft on M is called gradient-like whenever its non-wandering set consists of finitely many hyperbolic equilibria and their invariant manifolds intersects transversally. We prove that if invariant manifolds of distinct saddles of a gradient-like flow ft on M do not intersect each other (in other words, ft has no heteroclinic intersections), then for each saddle of ft its Morse index (i.e. dimension of the unstable manifold) is either 1 or n-1, so there are no saddles with Morse indices i∈\2,…,n-2\.