Secondary Stiefel-Whitney numbers and corresponding cobordism groups

Abstract

For every relation R between Stiefel-Whitney numbers of closed (n+1)-manifolds we consider an associated invariant R of null-cobordant n-manifolds with a certain additional structure. For n=2k-1 and R = wn+1+vk2 the invariant R equals the Kervaire semi-characteristic. In addition, we construct the cobordism group nR, which extends the unoriented cobordism group nO. We show that R is a complete invariant of R-cobordism classes of null-cobordant n-manifolds. We prove that our invariant R and R-cobordism class of manifold are quadratic in the sense of Gusarov-Vassiliev-Podkorytov.

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