Monochromatic k in a row

Abstract

We study a variant of the k-in-a-row game in which players alternatively claim positions until a k-in-a-row is created among all claimed positions. This leads to the constraint near k-in-a-row avoiding on configurations and the associated problem of determining their extremal densities of such configurations. We investigate this problem on two types of boards: the grid Z2 and hypercubes [k]d. For the grid Z2, we establish nearly tight bounds on the maximum density D(k,Z2), showing that D(k,Z2)=1-2k whenever 3 k, and determine both D(3,Z2) and d(3,Z2) exactly. We also bound the minimum density d(k,Z2) up to a gap of (8+o(1))k-1. For hypercubes [k]d, we derive asymptotic bounds on D(k,[k]d) up to order k-2 and obtain the exact value of d(k,[k]d). Our results contrast with the classical no-(k+1)-in-line problem, a similar problem imposing different constraint, where the trivial upper bound is conjectured to be attainable.