Categorified Crystal Structure on Localized Quantum Coordinate Rings
Abstract
For the quiver Hecke algebra associated with a simple Lie algebra, let -gmod be the category of finite-dimensional graded -modules. It is well-known that it categorifies the unipotent quantum coordinate ring. The localization of -gmod has been defined in [12]. Its Grothendieck ring defines the localized (unipotent) quantum coordinate ring. We shall give a certain crystal structure on the localized quantum coordinate ring by regarding the set of self-dual simple objects in localized -gmod. We also give the isomorphism of crystals to the cellular crystal for an arbitrary reduced word of the longest Weyl group element. This result can be seen as a localized version of the categorification for the crystal of the nilpotent half of quantum algebra by Lauda and Vazirani.
Keywords
Cite
@article{arxiv.2208.08396,
title = {Categorified Crystal Structure on Localized Quantum Coordinate Rings},
author = {Toshiki Nakashima},
journal= {arXiv preprint arXiv:2208.08396},
year = {2022}
}
Comments
30pages, added the proof of Proposition 3.8. and corrected some typos