Borsuk-Ulam theorems for products of spheres and Stiefel manifolds revisited

Abstract

We give a different and possibly more accessible proof of a general Borsuk--Ulam theorem for a product of spheres, originally due to Ramos. That is, we show the non-existence of certain (Z/2)k-equivariant maps from a product of k spheres to the unit sphere in a real (Z/2)k-representation of the same dimension. Our proof method allows us to derive Borsuk--Ulam theorems for certain equivariant maps from Stiefel manifolds, from the corresponding results about products of spheres, leading to alternative proofs and extensions of some results of Fadell and Husseini.