Borsuk and Ramsey type questions in Euclidean space

Abstract

We give a short survey of problems and results on (1) diameter graphs and hypergraphs, and (2) geometric Ramsey theory. We also make some modest contributions to both areas. Extending a well known theorem of Kahn and Kalai which disproved Borsuk's conjecture, we show that for any integer r 2, there exist =(r)>0 and d0=d0(r) with the following property. For every d d0, there is a finite point set P⊂Rd of diameter 1 such that no matter how we color the elements of P with fewer than (1+)d colors, we can always find r points of the same color, any two of which are at distance 1.