Bruhat inversions in Weyl groups and torsion-free classes over preprojective algebras

@article{Enomoto2020BruhatII,
  title={Bruhat inversions in Weyl groups and torsion-free classes over preprojective algebras},
  author={Haruhisa Enomoto},
  journal={Communications in Algebra},
  year={2020},
  volume={49},
  pages={2156 - 2189}
}
  • H. Enomoto
  • Published 21 February 2020
  • Mathematics
  • Communications in Algebra
Abstract For an element w of a simply-laced Weyl group, Buan-Iyama-Reiten-Scott defined a subcategory of the module category over the preprojective algebra of Dynkin type. This paper studies categorical properties of using the root system. We show that simple objects in bijectively correspond to Bruhat inversion roots of w, and obtain a combinatorial criterion for to satisfy the Jordan-Hölder property (JHP). For type A case, we give a diagrammatic construction of simple objects, and show that… 
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