Almost-monochromatic sets and the chromatic number of the plane

Abstract

In a colouring of Rd a pair (S,s0) with S⊂eq Rd and with s0∈ S is almost monochromatic if S \s0\ is monochromatic but S is not. We consider questions about finding almost monochromatic similar copies of pairs (S,s0) in colourings of Rd, Zd, and in Q under some restrictions on the colouring. Among other results, we characterise those (S,s0) with S⊂eq Z for which every finite colouring of R without an infinite monochromatic arithmetic progression contains an almost monochromatic similar copy of (S,s0). We also show that if S⊂eq Zd and s0 is outside of the convex hull of S \s0\, then every finite colouring of Rd without a similar monochromatic copy of Zd contains an almost monochromatic similar copy of (S,s0). Further, we propose an approach of finding almost-monochromatic sets that might lead to a non-computer assisted proof of (2)≥ 5.