Path model for an extremal weight module over the quantized hyperbolic Kac-Moody algebra of rank 2

Abstract

Let g be a hyperbolic Kac-Moody algebra of rank 2, and set λ=1 - 2, where 1, 2 are the fundamental weights. Denote by V(λ) the extremal weight module of extremal weight λ with vλ the extremal weight vector, and by B(λ) the crystal basis of V(λ) with uλ the element corresponding to vλ. We prove that (i) B(λ) is connected, (ii) the subset B(λ)μ of elements of weight μ in B(λ) is a finite set for every integral weight μ, and B(λ)λ = \uλ\, (iii) every extremal element in B(λ) is contained in the Weyl group orbit of uλ, (iv) V(λ) is irreducible. Finally, we prove that the crystal basis B(λ) is isomorphic, as a crystal, to the crystal B(λ) of Lakshmibai-Seshadri paths of shape λ.