The h-polynomial and the rook polynomial of some polyominoes

Abstract

Let X be a convex polyomino such that its vertex set is a sublattice of N2. Let [X] be the toric ring (over a field ) associated to X in the sense of Qureshi, J. Algebra, 2012. Write the Hilbert series of [X] as (1 + h1 t + h2 t2 + ·s )/(1-t)([X]). For k ∈ N, let rk be the number of configurations in X with k pairwise non-attacking rooks. We show that h2 < r2 if X is not a thin polyomino. This partially confirms a conjectured characterization of thin polyominoes by Rinaldo and Romeo, J. Algebraic Combin., 2021.

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