Orthogonal shadows and index of Grassmann manifolds

Abstract

In this paper we study the /2 action on real Grassmann manifolds Gn(2n) and Gn(2n) given by taking (appropriately oriented) orthogonal complement. We completely evaluate the related /2 Fadell--Husseini index utilizing a novel computation of the Stiefel--Whitney classes of the wreath product of a vector bundle. These results are used to establish the following geometric result about the orthogonal shadows of a convex body: For n=2a (2 b+1), k=2a+1-1, C a convex body in 2n, and k real valued functions α1,…,αk continuous on convex bodies in 2n with respect to the Hausdorff metric, there exists a subspace V⊂eq2n such that projections of C to V and its orthogonal complement V have the same value with respect to each function αi, which is αi (pV(C))=αi (pV (C)) for all 1≤ i≤ k.