Construction of Irreducible Representations over Khovanov-Lauda-Rouquier Algebras of Finite Classical Type

Abstract

We give an explicit construction of irreducible modules over Khovanov-Lauda-Rouquier algebras R and their cyclotomic quotients Rλ for finite classical types using a crystal basis theoretic approach. More precisely, for each element v of the crystal B(∞) (resp. B(λ)), we first construct certain modules ∇(a;k) labeled by the adapted string a of v. We then prove that the head of the induced module ∈d (∇(a;1) ... ∇(a;n)) is irreducible and that every irreducible R-module (resp. Rλ-module) can be realized as the irreducible head of one of the induced modules ∈d (∇(a;1) ... ∇(a;n)). Moreover, we show that our construction is compatible with the crystal structure on B(∞) (resp. B(λ)).