Deformations of smooth function on 2-torus whose KR-graph is a tree

Abstract

Let f:T2 R be Morse function on 2-torus T2, and O(f) be the orbit of f with respect to the right action of the group of diffeomorphisms D(T2) on C∞(T2). Let also Of(f,X) be a connected component of O(f,X) which contains f. In the case when Kronrod-Reeb graph of f is a tree we obtain the full description of π1Of(f). This result also holds for more general class of smooth functions f:T2 R which have the following property: for each critical point z of f the germ f of z is smoothly equivalent to some homogeneous polynomial R2 R2 without multiple points. Translated from Ukrainian