Morse-Novikov numbers, tunnel numbers, and handle numbers of sutured manifolds

Abstract

Developed from geometric arguments for bounding the Morse-Novikov number of a link in terms of its tunnel number, we obtain upper and lower bounds on the handle number of a Heegaard splitting of a sutured manifold (M,γ) in terms of the handle number of its decompositions along a surface representing a given 2nd homology class. Fixing the sutured structure (M,γ), this leads us to develop the handle number function h H2(M,∂ M;R) N which is bounded, constant on rays from the origin, and locally maximal. Furthermore, for an integral class , h()=0 if and only if the decomposition of (M,γ) along some surface representing is a product manifold.