Topological transversals to a family of convex sets

Abstract

Let F be a family of compact convex sets in Rd. We say that F has a topological -transversal of index (m,k) (<m, 0<k≤ d-m) if there are, homologically, as many transversal m-planes to F as m-planes containing a fixed -plane in Rm+k. Clearly, if F has a -transversal plane, then F has a topological -transversal of index (m,k), for <m and k≤ d-m. The converse is not true in general. We prove that for a family F of +k+1 compact convex sets in Rd a topological -transversal of index (m,k) implies an ordinary -transversal. We use this result, together with the multiplication formulas for Schubert cocycles, the Lusternik-Schnirelmann category of the Grassmannian, and different versions of the colorful Helly theorem by B\'ar\'any and Lov\'asz, to obtain some geometric consequences.