Stronger counterexamples to the topological Tverberg conjecture

Abstract

Denote by M the M-dimensional simplex. A map f M Rd is an almost r-embedding if fσ1… fσr= whenever σ1,…,σr are pairwise disjoint faces. A counterexample to the topological Tverberg conjecture asserts that if r is not a prime power and d2r+1, then there is an almost r-embedding (d+1)(r-1) Rd. This was improved by Blagojevi\'c-Frick-Ziegler using a simple construction of higher-dimensional counterexamples by taking k-fold join power of lower-dimensional ones. We improve this further (for d large compared to r): If r is not a prime power and N:=(d+1)r-rd+2r+1-2, then there is an almost r-embedding N Rd. For the r-fold van Kampen-Flores conjecture we also produce counterexamples which are stronger than previously known. Our proof is based on generalizations of the Mabillard-Wagner theorem on construction of almost r-embeddings from equivariant maps, and of the \"Ozaydin theorem on existence of equivariant maps.