Alexander Kleshchev, Joseph Loubert
Published 2013-10-16Version 1
We prove that the Khovanov-Lauda-Rouquier algebras $R_\alpha$ of finite type are (graded) affine cellular in the sense of Koenig and Xi. In fact, we establish a stronger property, namely that the affine cell ideals in $R_\alpha$ are generated by idempotents. This in particular implies the (known) result that the global dimension of $R_\alpha$ is finite.
Affine Cellularity of Khovanov-Lauda-Rouquier algebras in type A
Affine cellularity of BLN-algebras
Support varieties of $(\frak g, \frak k)$-modules of finite type
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