The boundary algebra of a GLm-dimer
Abstract
We consider GLm-dimers of triangulations of regular convex n-gons, which give rise to a dimer model with boundary Q and a dimer algebra Q. Let eb be the sum of the idempotents of all the boundary vertices, and BQ:= eb Q eb the associated boundary algebra. In this article we show that given two different triangulations T1 and T2 of the n-gon, the boundary algebras are isomorphic, i.e. eb QT1 eb eb QT2 eb.
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