Another Note on Intervals in the Hales-Jewett Theorem

Abstract

The Hales-Jewett Theorem states that any r-colouring of [m]n contains a monochromatic combinatorial line if n is large enough. Shelah's proof of the theorem implies that for m = 3 there always exists a monochromatic combinatorial lines whose set of active coordinates is the union of at most r intervals. Conlon and Kamcev proved the existence of colourings for which it cannot be fewer than r intervals if r is odd. For r = 2 however, Leader and R\"aty showed that one can always find a monochromatic combinatorial line whose active coordinate set is a single interval. In this paper, we extend the result of Leader and R\"aty to the case of all even r, showing that one can always find a monochromatic combinatorial line in [3]n whose set of active coordinate is the union of at most r-1 intervals.