Nonlocality and the central geometry of dimer algebras

Abstract

Let A be a dimer algebra and Z its center. It is well known that if A is cancellative, then A and Z are noetherian and A is a finitely generated Z-module. Here we show the converse: if A is non-cancellative (as almost all dimer algebras are), then A and Z are nonnoetherian and A is an infinitely generated Z-module. Although Z is nonnoetherian, we show that it nonetheless has Krull dimension 3 and is generically noetherian. Furthermore, we show that the reduced center is the coordinate ring for a Gorenstein algebraic variety with the strange property that it contains precisely one 'smeared-out' point of positive geometric dimension. In our proofs we introduce formalized notions of Higgsing and the mesonic chiral ring from quiver gauge theory.