Optimal bounds for a colorful Tverberg--Vrecica type problem

Abstract

We prove the following optimal colorful Tverberg-Vrecica type transversal theorem: For prime r and for any k+1 colored collections of points Cl of size |Cl|=(r-1)(d-k+1)+1 in Rd, where each Cl is a union of subsets (color classes) Cil of size smaller than r, l=0,...,k, there are partition of the collections Cl into colorful sets F1l,...,Frl such that there is a k-plane that meets all the convex hulls conv(Fjl), under the assumption that r(d-k) is even or k=0. Along the proof we obtain three results of independent interest: We present two alternative proofs for the special case k=0 (our optimal colored Tverberg theorem (2009)), calculate the cohomological index for joins of chessboard complexes, and establish a new Borsuk-Ulam type theorem for (Zp)m-equivariant bundles that generalizes results of Volovikov (1996) and Zivaljevic (1999).