On reconstructing Morse-Bott functions with prescribed preimages on 3-dimensional manifolds and conditions for the reconstruction

Abstract

We present conditions for reconstruction of Morse-Bott functions with prescribed preimages on 3-dimensional manifolds. The present work strengthens a previous result for the Morse function case by the author and present a related example as another result. This shows a new result on reconstruction of nice smooth functions such that preimages are as prescribed. Such a study has been fundamental, natural, and surprisingly, founded recently, in 2006, by Sharko. Reconstruction of nice smooth functions on closed surfaces has been followed by Masumoto-Saeki, for example, and later, Gelbukh, Marzantowicz, Michalak, and so on, are studying Morse function cases further. The author has started explicit studies for 3-dimensional cases respecting topologies of preimages of single points and obtained several results. We add another result on this.