On the height of the first Stiefel-Whitney class

Abstract:

Let ${G_k}({{\mathbf {R}}^{n + k}})$ denote the grassmann manifold of k-planes in real $(n + k)$-space and ${w_1} \in {H^1}({G_k}({{\mathbf {R}}^{n + k}});{{\mathbf {Z}}_2})$ the first Stiefel-Whitney class of the universal bundle. We determine, for many (k, n), the exact height of ${w_1}$ in the cohomology ring. We also indicate the combinatorial significance of the complex analogue of these computations.