Homotopy properties of smooth functions on the M\"obius band

Abstract

Let B be a M\"obius band and f:B R be a Morse map taking a constant value on ∂ B, and S(f,∂ B) be the group of diffeomorphisms h of B fixed on ∂ B and preserving f in the sense that f h = f. Under certain assumptions on f we compute the group π0S(f,∂ B) of isotopy classes of such diffeomorphisms. In fact, those computations hold for functions f:B whose germs at critical points are smoothly equivalent to homogeneous polynomials R2 without multiple factors. Together with previous results of the second author this allows to compute similar groups for certain classes of smooth functions f:N on non-orientable surfaces N.