Smooth functions that split a Klein bottle into two M\"obius bands

Abstract

Given a compact surface M, consider the right action C∞(M)×D(M)∞(M), (f, h) f h, of the group D(M) of C∞ diffeomorphisms of M on the space C∞(M) of C∞ functions on M. For f∈C∞(M) denote by O(f) its orbit, and by Of(f) the path component of O(f) containing f. The paper continues a series of computations by many authors of homotopy types of orbits Of(f) of smooth functions on compact surfaces. We provide here the computations of Of(f) for a special class of functions f∈C∞(K) on the Klein bottle K having the following properties: (i) at each critical point f is smoothly equivalent to some homogeneous polynomial (e.g. f is Morse), and (ii) there is a regular connected component α of a level set of f such that Kα is a disjoint union of two open M\"obius bands, with closures M1 and M2. Let fi = f|Mi be the restriction of f to the M\"obius band Mi, i=1,2, and Ofi(fi) be the path component of fi in its orbit with respect to the above action of D(Mi). The possible homotopy types of Ofi(fi) are explicitly computed earlier. We prove that Of(f) is homotopy equivalent to Of1(f1) × Of2(f2).