Enumerating maximal tatami mat coverings of square grids with v vertical dominoes

Abstract

We enumerate a certain class of monomino-domino coverings of square grids, which conform to the tatami restriction; no four tiles meet. Let Tn be the set of monomino-domino tatami coverings of the n× n grid with the maximum number, n, of monominoes, oriented so that they have a monomino in each of the top left and top right corners. We give an algorithm for exhaustively generating the coverings in Tn with exactly v vertical dominoes in constant amortized time, and an explicit formula for counting them. The polynomial that generates these counts has the factorisation align* Pn(z)Πj 1 S n-22j (z), align* where Sn(z) = Πi=1n (1 + zi), and Pn(z) is an irreducible polynomial, at least for 1 < n < 200. We present some compelling properties and conjectures about Pn(z). For example Pn(1) = n2(n-2)-1 for all n 2, where (n) is the number of 1s in the binary representation of n and deg(Pn(z)) = Σk=1n-2 Od(k), where Od(k) is the largest odd divisor of k.