Orbits of smooth functions on 2-torus and their homotopy types

Abstract

Let f:T2 be a Morse function on 2-torus T2 such that its Kronrod-Reeb graph (f) has exactly one cycle, i.e. it is homotopy equivalent to S1. Under some additional conditions we describe a homotopy type of the orbit of f with respect to the action of the group of diffeomorphism of T2. This result holds for a larger class of smooth functions f:T2 having the following property: for every critical point z of f the germ of f at z is smoothly equivalent to a homogeneous polynomial R2 without multiple factors.