Combinatorial Reid's recipe for consistent dimer models
Author:
Craw Alastair,Heuberger Liana,Amador Jesus Tapia
Abstract
Reid's recipe for a finite abelian subgroup $G\subset
\text{SL}(3,\mathbb{C})$ is a combinatorial procedure that marks the toric fan
of the $G$-Hilbert scheme with irreducible representations of $G$. The
geometric McKay correspondence conjecture of Cautis--Logvinenko that describes
certain objects in the derived category of $G\text{-Hilb}$ in terms of Reid's
recipe was later proved by Logvinenko et al. We generalise Reid's recipe to any
consistent dimer model by marking the toric fan of a crepant resolution of the
vaccuum moduli space in a manner that is compatible with the geometric
correspondence of Bocklandt--Craw--Quintero-V\'{e}lez. Our main tool
generalises the jigsaw transformations of Nakamura to consistent dimer models.
Comment: 29 pages, published version
Publisher
Centre pour la Communication Scientifique Directe (CCSD)
Subject
Geometry and Topology,Algebra and Number Theory
Cited by
1 articles.
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