Cluster expansion formulas and perfect matchings for type B and C

Abstract

Let P2n+2 be the regular polygon with 2n+2 vertices, and let θ be the rotation of 180. Fomin and Zelevinsky proved that θ-invariant triangulations of P2n+2 are in bijection with the clusters of cluster algebras of type Bn or Cn. Furthermore, cluster variables correspond to the orbits of the action of θ on the diagonals of P2n+2. In this paper, we associate a labeled modified snake graph Gab to each θ-orbit [a,b], and we get the cluster variables of type Bn and Cn which correspond to [a,b] as perfect matching Laurent polynomials of Gab. This extends the work of Musiker for cluster algebras of type B and C to every seed.

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