Recent Advances in the Theory of Polyomino Ideals
Abstract
Polyomino ideals, defined as the ideals generated by the inner 2-minors of a polyomino, are a class of binomial ideals whose algebraic properties are closely related to the combinatorial structure of the underlying polyomino. We provide a unified account of recent advances on two central themes: the characterization of prime polyomino ideals and the emerging connection between the Hilbert-Poincar\'e series and Gorensteinness of K[P] with the classical rook theory. Some further related properties, as radicality, primary decomposition, and levelness are discussed, and a Macaulay2 package, namely PolyominoIdeals, is also presented.
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