Enumerations of lozenge tilings, lattice paths, and perfect matchings and the weak Lefschetz property

Abstract: MacMahon enumerated the plane partitions in an $a \times b \times c$ box. These are in bijection to lozenge tilings of a hexagon, to certain perfect matchings, and to families of non-intersecting lattice paths. In this work we consider more general regions, called triangular regions, and establish signed versions of the latter three bijections. Indeed, we use perfect matchings and families of non-intersecting lattice paths to define two signs of a lozenge tiling. A combinatorial argument involving a new method, called resolution of a puncture, then shows that the signs are in fact equivalent. This provides in particular two different determinantal enumerations of these families. These results are then applied to study the weak Lefschetz property of Artinian quotients by monomial ideals of a three-dimensional polynomial ring. We establish sufficient conditions guaranteeing the weak Lefschetz property as well as the semistability of the syzygy bundle of the ideal, classify the type two algebras with the weak Lefschetz property, and study monomial almost complete intersections in depth. Furthermore, we develop a general method that often associates to an algebra that fails the weak Lefschetz property a toric surface that satisfies a Laplace equation. We also present examples of toric varieties that satisfy arbitrarily many Laplace equations. Our combinatorial methods allow us to address the dependence on the characteristic of the base field for many of our results.