English

Heaps, crystals, and preprojective algebra modules

Representation Theory 2024-11-26 v4 Quantum Algebra

Abstract

Fix a simply-laced semisimple Lie algebra. We study the crystal B(nλ) B(n\lambda), were λ\lambda is a dominant minuscule weight and nn is a natural number. On one hand, B(nλ)B(n\lambda) can be realized combinatorially by height nn reverse plane partitions on a heap associated to λ\lambda. On the other hand, we use this heap to define a module over the preprojective algebra of the underlying Dynkin quiver. Using the work of Saito and Savage-Tingley, we realize B(nλ)B(n\lambda) via irreducible components of the quiver Grassmannian of nn copies of this module. In this paper, we describe an explicit bijection between these two models for B(nλ)B(n\lambda) and prove that our bijection yields an isomorphism of crystals. Our main geometric tool is Nakajima's tensor product quiver varieties.

Keywords

Cite

@article{arxiv.2202.02490,
  title  = {Heaps, crystals, and preprojective algebra modules},
  author = {Anne Dranowski and Balazs Elek and Joel Kamnitzer and Calder Morton-Ferguson},
  journal= {arXiv preprint arXiv:2202.02490},
  year   = {2024}
}

Comments

42 pages

R2 v1 2026-06-24T09:21:25.677Z