Connected components of spaces of Morse functions with fixed critical points

Abstract

Let M be a smooth closed orientable surface and F=Fp,q,r be the space of Morse functions on M having exactly p critical points of local minima, q1 saddle critical points, and r critical points of local maxima, moreover all the points are fixed. Let Ff be the connected component of a function f∈ F in F. By means of the winding number introduced by Reinhart (1960), a surjection π0(F) Zp+r-1 is constructed. In particular, |π0(F)|=∞, and the Dehn twist about the boundary of any disk containing exactly two critical points, exactly one of which is a saddle point, does not preserve Ff. Let D be the group of orientation preserving diffeomorphisms of M leaving fixed the critical points, D0 be the connected component of idM in D, and Df⊂ D the set of diffeomorphisms preserving Ff. Let Hf be the subgroup of Df generated by D0 and all diffeomorphisms h∈ D which preserve some functions f1∈ Ff, and let Hf abs be its subgroup generated D0 and the Dehn twists about the components of level curves of functions f1∈ Ff. We prove that Hf abs⊂neq Df if q2, and construct an epimorphism Df/ Hf abs Z2q-1, by means of the winding number. A finite polyhedral complex K=Kp,q,r associated to the space F is defined. An epimorphism μ:π1(K) Df/ Hf and finite generating sets for the groups Df/ D0 and Df/ Hf in terms of the 2-skeleton of the complex K are constructed.