The Morse-Bott inequalities via dynamical systems

Abstract

Let f:M R be a Morse-Bott function on a compact smooth finite dimensional manifold M. The polynomial Morse inequalities and an explicit perturbation of f defined using Morse functions fj on the critical submanifolds Cj of f show immediately that MBt(f) = Pt(M) + (1+t)R(t), where MBt(f) is the Morse-Bott polynomial of f and Pt(M) is the Poincar\'e polynomial of M. We prove that R(t) is a polynomial with nonnegative integer coefficients by showing that the number of gradient flow lines of the perturbation of f between two critical points p,q ∈ Cj coincides with the number of gradient flow lines between p and q of the Morse function fj. This leads to a relationship between the kernels of the Morse-Smale-Witten boundary operators associated to the Morse functions fj and the perturbation of f. This method works when M and all the critical submanifolds are oriented or when Z2 coefficients are used.