Deformational symmetries of smooth functions on non-orientable surfaces

Abstract

Given a compact surface M, consider the natural right action of the group of diffeomorphisms D(M) of M on C∞(M,R) defined by the rule: (f,h) f h for f∈ C∞(M,R) and h∈D(M). Denote by F(M) the subset of C∞(M,R) consisting of function f:M taking constant values on connected components of ∂M, having no critical points on ∂M, and such that at each of its critical points z the function f is C∞ equivalent to some homogenenous polynomial without multiple factors. In particular, F(M) contains all Morse maps. Let also O(f) = \ f h h∈D(M) \ be the orbit of f. Previously it was computed the algebraic structure of π1O(f) for all f∈F(M), where M is any orientable compact surface distinct from 2-sphere. In the present paper we compute the group π0S(f,∂M), where M is a M\"obius band, and S(f,∂M) = \ h∈D(M) f h = f, \ h|∂ M = idM\ is the subgroup of the corresponding stabilizer of f consisting of diffeomorphisms fixed on the boundary ∂ M. As a consequence we obtain an explicit algebraic description of π1O(f) for all non-orientable surfaces distinct from Klein bottle and projective plane.