Classifying unavoidable Tverberg partitions

Abstract

Let T(d,r) = (r-1)(d+1)+1 be the parameter in Tverberg's theorem, and call a partition I of \1,2,…,T(d,r)\ into r parts a "Tverberg type". We say that I "occurs" in an ordered point sequence P if P contains a subsequence P' of T(d,r) points such that the partition of P' that is order-isomorphic to I is a Tverberg partition. We say that I is "unavoidable" if it occurs in every sufficiently long point sequence. In this paper we study the problem of determining which Tverberg types are unavoidable. We conjecture a complete characterization of the unavoidable Tverberg types, and we prove some cases of our conjecture for d 4. Along the way, we study the avoidability of many other geometric predicates. Our techniques also yield a large family of T(d,r)-point sets for which the number of Tverberg partitions is exactly (r-1)!d. This lends further support for Sierksma's conjecture on the number of Tverberg partitions.