Localizations for quiver Hecke algebras
Abstract
We provide the localization procedure for monoidal categories by a real commuting family of braiders. For an element w of the Weyl group, Cw is a subcategory of modules over quiver Hecke algebra which categorifies the quantum unipotent coordinate algebra Aq[n(w)]. We construct the localization Cw of Cw by adding the inverses of simple modules which correspond to the frozen variables in the quantum cluster algebra Aq[n(w)]. The localization Cw is left rigid and we expect that it is rigid.
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