Crystal bases and canonical bases for quantum Borcherds-Bozec algebras

Abstract

Let Uq-( g) be the negative half of a quantum Borcherds-Bozec algebra Uq( g) and V(λ) be the irreducible highest weight module with λ ∈ P+. In this paper, we investigate the structures, properties and their close connections between crystal bases and canonical bases of Uq-( g) and V(λ). We first re-construct crystal basis theory with modified Kashiwara operators. While going through Kashiwara's grand-loop argument, we prove several important lemmas, which play crucial roles in the later developments of the paper. Next, based on the theory of canonical bases on quantum Bocherds-Bozec algebras, we introduce the notion of primitive canonical bases and prove that primitive canonical bases coincide with lower global bases.

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