Symplectic Grassmannians and cyclic quivers

Evgeny Feigin, Martina Lanini, Matteo Micheli, Alexander Pütz

Research output: Contribution to journalArticlepeer-review

Abstract

The goal of this paper is to extend the quiver Grassmannian description of certain degenerations of Grassmann varieties to the symplectic case. We introduce a symplectic version of quiver Grassmannians studied in our previous papers and prove a number of results on these projective algebraic varieties. First, we construct a cellular decomposition of the symplectic quiver Grassmannians in question and develop combinatorics needed to compute Euler characteristics and Poincaré polynomials. Second, we show that the number of irreducible components of our varieties coincides with the Euler characteristic of the classical symplectic Grassmannians. Third, we describe the automorphism groups of the underlying symplectic quiver representations and show that the cells are the orbits of this group. Lastly, we provide an embedding into the affine flag varieties for the affine symplectic group.

Original languageEnglish
JournalAnnali di Matematica Pura ed Applicata
DOIs
StateAccepted/In press - 2024

Keywords

  • 14M15 Grassmannians
  • 16G20 Representations of quivers and partially ordered sets
  • Affine flag varieties
  • flag manifolds
  • Quiver Grassmannians
  • Quiver representations
  • Schubert varieties
  • Symplectic Grassmannians

All Science Journal Classification (ASJC) codes

  • Applied Mathematics

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