On upper bounds for the multi-fold chromatic numbers of the plane

Abstract

The multi-fold chromatic number of the plane m is the smallest number of colors k, sufficient to color each point of the Euclidean plane in exactly m colors, so that for any pair of points at a unit distance from each other, two corresponding m-subsets of k-set do not contain any common color. We consider upper bounds for m-fold chromatic numbers of the plane. Our main result is that for any m the inequality m<(1+2/3)2· m+3.501 holds.