Problems on the Triangular Lattice

Abstract

In this work, we consider a number of problems defined on the triangular lattice with n rows, which we will denote as Tn. Define a proper coloring to be an assignment of colors to the points of Tn such that no three points constituting the vertices of an equilateral triangle all receive the same color, and denote by f(n) the smallest possible number of colors that can be used in a proper coloring of Tn. We either determine exactly or give upper bounds for f(n) for many small values of n, and it is shown that n∞ f(n)n ≤ 13. We also give formulas counting the number of pairs of points in Tn for which there are, respectively, 0, 1, or 2 choices of points in Tn which extend those two into the vertices of an equilateral triangle. Along the way, we pose a number of related questions.

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