On Topological Classification of Morse-Smale Diffeomorphisms on the Sphere Sn

Abstract

We consider a class G(Sn) of orientation preserving Morse-Smale diffeomorphisms of the sphere Sn of dimension n>3 in assumption that invariant manifolds of different saddle periodic points have no intersection. We put in a correspondence for every diffeomorphism f∈ G(Sn) a colored graph f enriched by an automorphism Pf. Then we define the notion of isomorphism between two colored graphs and prove that two diffeomorphisms f, f'∈ G(Sn) are topologically conjugated iff the graphs f, f' are isomorphic. Moreover we establish the existence of a linear-time algorithm for distinguishing two colored graphs of diffeomorphisms from the class G(Sn).