On a conjecture of McNeil

Abstract

Suppose that the n2 vertices of the grid graph Pn2 are labeled, such that the set of their labels is \1,2,…,n2\. The labeling induces a walk on Pn2, beginning with the vertex whose label is 1, proceeding to the vertex whose label is 2, etc., until all vertices are visited. The question of the maximal possible length of such a walk, denoted by M(Pn2), when the distance between consecutive vertices is the Manhattan distance, was studied by McNeil, who, based on empirical evidence, conjectured that M(Pn2)=n3-3, if n is even, and n3-n-1, otherwise. In this work we study the more general case of Pm× Pn and capture M(Pm× Pn), up to an additive factor of 1. This holds, in particular, for the values conjectured by McNeil.