Categorification of Quantum Generalized Kac-Moody Algebras and Crystal Bases

Abstract

We construct and investigate the structure of the Khovanov-Lauda-Rouquier algebras R and their cyclotomic quotients Rλ which give a categrification of quantum generalized Kac-Moody algebras. Let U() be the integral form of the quantum generalized Kac-Moody algebra associated with a Borcherds-Cartan matrix A=(aij)i,j ∈ I and let K0(R) be the Grothedieck group of finitely generated projective graded R-modules. We prove that there exists an injective algebra homomorphism : U-() K0(R) and that is an isomorphism if aii 0 for all i∈ I. Let B(∞) and B(λ) be the crystals of Uq-() and V(λ), respectively, where V(λ) is the irreducible highest weight Uq()-module. We denote by B(∞) and B(λ) the isomorphism classes of irreducible graded modules over R and Rλ, respectively. If aii 0 for all i∈ I, we define the Uq()-crystal structures on B(∞) and B(λ), and show that there exist crystal isomorphisms B(∞) B(∞) and B(λ) B(λ). One of the key ingredients of our approach is the perfect basis theory for generalized Kac-Moody algebras.