Automorphisms of cellular divisions of 2-sphere induced by functions with isolated critical points

Abstract

Let f:S2 R be a Morse function on the 2-sphere and K be a connected component of some level set of f containing at least one saddle critical point. Then K is a 1-dimensional CW-complex cellularly embedded into S2, so the complement S2 K is a union of open 2-disks D1,…, Dk. Let SK(f) be the group of isotopic to the identity diffeomorphisms of S2 leaving invariant K and also each level set f-1(c), c∈R. Then each h∈ SK(f) induces a certain permutation σh of those disks. Denote by G = \ σh h ∈ SK(f)\ be the group of all such permutations. We prove that G is isomorphic to a finite subgroup of SO(3).