Cobordism Categories and Parametrized Morse Theory

Abstract

Fix a tangential structure θ: B BO(d+1) and an integer k < d/2. In this paper we determine the homotopy type of a cobordism category Cobmf, kθ, where morphisms are given by θ-cobordisms W: P Q equipped with a choice of proper Morse function hW: W [0, 1], with the property that all critical points c ∈ W of hW satisfy the condition: k < index(c) < d-k+1. In particular, we prove that there is a weak homotopy equivalence BCobmf, kθ ∞hWkθ, where hWkθ is a Thom spectrum associated to the space of Morse jets on Rd+1. In the special case that k = -1, the equivalence BCobmf, -1θ ∞hW-1θ follows from the work of Madsen and Weiss used in their celebrated proof of the Mumford conjecture. Following the methods of Madsen and Weiss we use the weak equivalence BCobmf, kθ ∞hWkθ to give an alternative proof the "high-dimensional Madsen-Weiss theorem" of Galatius and Randal-Williams which identifies the homology of the moduli spaces, BDiff((Sn× Sn)\# g, D2n), in the limit g ∞.