Stable Pontryagin-Thom construction for proper maps II

Abstract

In arXiv:1905.07734 we presented a construction that is an analogue of Pontryagin's for proper maps in stable dimensions. This gives a bijection between the cobordism set of framed embedded compact submanifolds in W×Rn for a given manifold W and a large enough number n, and the homotopy classes of proper maps from W×Rn to Rk+n. In the present paper we generalise this result in a similar way as Thom's construction generalises Pontryagin's. In other words, we present a bijection between the cobordism set of submanifolds embedded in W×Rn with normal bundles induced from a given bundle n, and the homotopy classes of proper maps from W×Rn to a space U(n) that depends on the given bundle. An important difference between Thom's construction and ours is that we also consider cobordisms of non-compact manifolds after indroducing a suitable notion of cobordism relation for these.