Morse functions with regular level sets consisting of 2-dimensional spheres, 2-dimensional tori, or Klein Bottles

Abstract

In this paper, we study Morse functions with regular level sets consisting of spheres, tori, or Klein Bottles on 3-dimensional closed manifolds. We characterize 3-dimensional manifolds represented by connected sums each of whose summands is the product S1 × S2 of the circle S1 and the sphere S2, lens spaces, or non-orientable closed and connected manifolds of genus 1 by a certain subclass of such Morse functions. This is a kind of extensions of the orientable case, by Saeki, in 2006. This is a variant of its extension by the author for 3-dimensional orientable manifolds represented by connected sums each of whose summands is the product S1 × S2, lens spaces, or torus bundles over S1 by a certain class of Morse-Bott functions. We also classify Morse functions with given regular level sets consisting of S2, S1 × S1, or Klein Bottles in a certain sense, generalizing some previous work by the author.