Mappings into the Stiefel manifold and cross-cap singularities

Abstract

Take n>k>1 such that n-k is odd. In this paper we consider mapping a from (n-k+1)-dimensional closed ball into the space of (n × k)--matrices such that its restriction to a sphere goes into the Stiefel manifold Vk(Rn). We construct a homotopy invariant \ of a|Sn-k which defines an isomorphism between (n-k)-th group of homotopy of Vk(n) and Z2. It can be used to calculate in an effective way the class of a|Sn-k in this homotopy group for a polynomial mapping a and to find the number mod 2 of cross-cap singularities of a mapping from a closed m-dimensional ball into R2m-1, m even.