Crystals of Lakshmibai-Seshadri paths and extremal weight modules over quantum hyperbolic Kac-Moody algebras of rank 2
Abstract
Let g be a hyperbolic Kac-Moody algebra of rank 2, and let λ be an arbitrary integral weight. We denote by B(λ) the crystal of all Lakshmibai-Seshadri paths of shape λ. Let V(λ) be the extremal weight module of extremal weight λ generated by the (cyclic) extremal weight vector vλ of weight λ, and let B(λ) be the crystal basis of V(λ) with uλ ∈ B(λ) the element corresponding to vλ. We prove that the connected component B0(λ) of B(λ) containing uλ is isomorphic, as a crystal, to the connected component B0(λ) of B(λ) containing the straight line πλ. Furthermore, we prove that if λ satisfies a special condition, then the crystal basis B(λ) is isomorphic, as a crystal, to the crystal B(λ). As an application of these results, we obtain an algorithm for computing the number of elements of weight μ in B(1-2), where 1, 2 are the fundamental weights, in the case that g is symmetric.
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