A Bilinear Form for Spinc Manifolds

Abstract

Let M be a closed oriented spinc manifold of dimension (8n + 2) with fundamental class [M], and let 2 H4n(M; Z) → H4n(M; Z/2) denote the ~ 2 reduction homomorphism. For any torsion class t ∈ H4n(M;Z), we establish the identity \[ 2(t) · Sq2 2 (t), [M] = 2 (t) · Sq2 v4n(M), [M], \] where Sq2 is the Steenrod square, v4n(M) is the 4n-th Wu class of M, x· y denotes the cup product of x and y, and · ~, ~· denotes the Kronecker product. This result generalizes the work of Landweber and Stong from spin to spinc manifolds. As an application, let βZ/2 H4n+2(M; Z/2) H4n+3(M; Z) be the Bockstein homomorphism associated to the short exact sequence of coefficients Z × 2 Z Z/2. We deduce that βZ/2(Sq2 v4n(M)) = 0, and consequently, Sq3 v4n(M) = 0, for any closed oriented spinc manifold M with M 8n+1.