Rigged configurations and the -involution for generalized Kac--Moody algebras
Abstract
We construct a uniform model for highest weight crystals and B(∞) for generalized Kac--Moody algebras using rigged configurations. We also show an explicit description of the -involution on rigged configurations for B(∞): that the -involution interchanges the rigging and the corigging. We do this by giving a recognition theorem for B(∞) using the -involution. As a consequence, we also characterize B(λ) as a subcrystal of B(∞) using the -involution.
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