Bordism of constrained Morse functions

Abstract

We call a Morse function f on a closed manifold k-constrained if neither f nor -f has critical points of indefinite Morse index < k. In this paper we study bordism groups of k-constrained Morse functions, and thus interpolate between the case k = 1 of bordism groups of Morse functions (computed by Ikegami) and the case k 1 of bordism groups of special generic functions (computed by Saeki). We employ Levine's elimination of cusps, Stein factorization, the two-index theorem of Hatcher-Wagoner, and a handle extension theorem for fold maps due to Gay-Kirby to show that the notion constrained bordism is strongly related to so-called connective bordism. As an application of our results we show that the oriented bordism group of constrained Morse functions detects exotic Kervaire spheres in certain dimensions.