Special framed Morse functions on surfaces

Abstract

Let M be a smooth closed orientable surface. Let F be the space of Morse functions on M, and F1 the space of framed Morse functions, both endowed with C∞-topology. The space F0 of special framed Morse functions is defined. We prove that the inclusion mapping F01 is a homotopy equivalence. In the case when at least (M)+1 critical points of each function of F are labeled, homotopy equivalences K M and F0 D0× K are proved, where K is the complex of framed Morse functions, M≈F1/ D0 is the universal moduli space of framed Morse functions, D0 is the group of self-diffeomorphisms of M homotopic to the identity.