Definable Cr vector bundles and bilinear spaces in an o-minimal structure and their homotopy theorems

Abstract

Consider an o-minimal structure on the real field. Let M be a definable Cr manifold, where r is a nonnegative integer. We first demonstrate an equivalence of the category of definable Cr vector bundles over M with the category of finitely generated projective modules over the ring Cdfr(M). Here, the notation Cdfr(M) denotes the ring of definable Cr functions on M. We also show an equivalence of the category of definable Cr bilinear spaces over M with the category of bilinear spaces over the ring Cdfr(M). The main theorems of this paper are homotopy theorems for definable Cr vector bundles and definable Cr bilinear spaces over M. As an application, we show that the Grothendieck rings K0(Cdfr(M)), K0(Cdf0(M)) and the Witt ring W(Cdfr(M)) are all isomorphic.