What does this research mean for the field?

Weighted Khovanov–Lauda–Rouquier–Webster algebras of finite type and their cyclotomic quotients are sandwich cellular algebras whose bases can be explicitly described using crystal graphs. Novelty: ClaimNovelty.NOVEL_FINDING. Consensus alignment: ConsensusAlignment.NEUTRAL.

What question did this study set out to answer?

The research aims to demonstrate the sandwich cellular structure of weighted KLR algebras using crystal graphs.

May 16, 2026Open Access

Cellularity of KLR and wKLRW algebras via crystals

Key Points

The research aims to demonstrate the sandwich cellular structure of weighted KLR algebras using crystal graphs.
Proved sandwich cellularity of weighted KLR algebras of finite type and their cyclotomic quotients.
Described sandwich cellular bases explicitly utilizing crystal graphs.
Derived explicit formulas for graded decomposition numbers of cyclotomic algebras at level one.
Establishes that weighted KLR algebras are sandwich cellular with explicit bases.
Validates that KLR algebras of finite type exhibit sandwich cellular structure.
Provides formulas for graded decomposition numbers, enhancing understanding of these algebras.

Abstract

We prove that the weighted Khovanov–Lauda–Rouquier–Webster algebras of finite type, and their cyclotomic quotients, are sandwich cellular algebras. The sandwich cellular bases are explicitly described using crystal graphs. As a special case, this proves that the Khovanov–Lauda–Rouquier algebras of finite type are sandwich cellular. As one of our applications, we give explicit formulas for some graded decomposition numbers of the cyclotomic algebras in level one.

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Cellularity of KLR and wKLRW algebras via crystals

Key Points

Abstract

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