A counting invariant for maps into spheres and for zero loci of sections of vector bundles

Abstract

The set of unrestricted homotopy classes [M,Sn] where M is a closed and connected spin (n+1)-manifold is called the n-th cohomotopy group πn(M) of M. Moreover it is known that πn(M) = Hn(M; Z) Z2 by methods from homotopy theory. We will provide a geometrical description of the Z2 part in πn(M) analogous to Pontryagin's computation of the stable homotopy group πn+1(Sn). This Z2 number can be computed by counting embedded circles in M with a certain framing of their normal bundle. This is a analogous result to the mod 2 degree theorem for maps M Sn+1. Finally we will observe that the zero locus of a section in an oriented rank n vector bundle E M defines an element in πn(M) and it turns out that the Z2 part is an invariant of the isomorphism class of E. At the end we show, that if the Euler class of E vanishes this Z2 invariant is the final obstruction to the existence of a nowhere vanishing section.