A user's guide to the topological Tverberg conjecture

Abstract

The topological Tverberg conjecture was considered a central unsolved problem of topological combinatorics. The conjecture asserts that for any integers r,d>1 and any continuous map f: Rd of the (d+1)(r-1)-dimensional simplex there are pairwise disjoint faces σ1,…,σr⊂ such that f(σ1) … f(σr). The conjecture was proved for a prime power r. Recently counterexamples for other r were found. Analogously, the r-fold van Kampen-Flores conjecture holds for a prime power r but does not hold for other r. The arguments form a beautiful and fruitful interplay between combinatorics, algebra and topology. We present a simplified exposition accessible to non-specialists in the area. We also mention some recent developments and open problems.