English

Grassmannian cluster subcategories and positroid varieties

Representation Theory 2026-03-24 v1

Abstract

A class of subcategories GP BB of the Grassmannian cluster category CM Ck,nC_{k, n} was constructed by Jensen--King--Su from certain superorders BB of Ck,nC_{k, n}, which they showed are in bijection with Grassmannian positroids of type (k,n)(k, n). We prove that GP BB admits a cluster substructure of CM Ck,nC_{k, n}, giving rise to a cluster algebra AcluA_{clu}. This naturally raises questions regarding the relationship of AcluA_{clu} to C[Gr(k,n)]C[Gr(k, n)] and to the coordinate ring of the positroid variety associated to BB. Using the cluster substructure, we show that the ice Gabriel quiver QUQ^\circ_U of a cluster tilting object UU\in GP BB, consisting of rank one modules, is a subquiver of QTQ^\circ_T with TT a cluster tilting object in CM Ck,nC_{k, n} containing UU as a summand. We also deduce that AcluA_{clu} is a subalgebra of C[Gr(k,n)]C[Gr(k, n)]. Moreover, applying a result of Canakci--King--Pressland on the Gabriel quiver QUQ_U in the case where BB is connected (i.e., has no repeated direct summands), we deduce that QUQ^\circ_U, for arbitrary BB, coincides with the quiver constructed by Muller-Speyer from a plabic graph whose face labels agree with the indices of the indecomposable summands of UU. Consequently, the localised algebra (Aclu)B(A_{clu})_B is isomorphic to the cluster algebra AMSA_{MS} of Muller-Speyer. We then construct bases for certain subalgebras and for an ideal of C[Gr(k,n)]C[Gr(k, n)], and apply these to prove that (Aclu)B(A_{clu})_B is naturally isomorphic to the coordinate ring of the open positroid variety. As a consequence, we obtain a new proof of Galashin--Lam's Theorem, identifying AMSA_{MS} with the coordinate ring of the open positroid variety, which was originally conjectured by Muller-Speyer. In the connected case, we note also that Pressland gave a categorification of the cluster structure following Galashin-Lam.

Keywords

Cite

@article{arxiv.2603.21458,
  title  = {Grassmannian cluster subcategories and positroid varieties},
  author = {Bernt Tore Jensen and Liam Riordan and Xiuping Su},
  journal= {arXiv preprint arXiv:2603.21458},
  year   = {2026}
}
R2 v1 2026-07-01T11:32:33.270Z