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Category $\mathcal{O}$ and asymptotic characters

Published 22 Jul 2025 in math.RT | (2507.16215v1)

Abstract: This paper defines an asymptotic character map which is a morphism from the Grothendieck group of category $\mathcal{O}$ of an integral filtered quantization to rational functions on the Lie algebra of a torus. We show that the asymptotic character of a module computes the equivariant multiplicity of its characteristic cycle. We then apply this construction to truncated shifted Yangians coming from simple, simply-laced Lie algebras and draw connections with characters of modules over KLR algebras using an equivalence of categories of arXiv:1806.07519. Our main theorem shows how this new formalism gives formulas relating equivariant multiplicities of Mirkovi\'{c}-Vilonen cycles and characters of modules over cyclotomic KLR algebras. We explain how this result provides evidence that the change-of-basis between Lusztig's dual canonical basis and the Mirkovi\'{c}-Vilonen basis of $\mathbb{C}[N]$ is computed by a characteristic cycle map whose domain is category $\mathcal{O}$ for truncated shifted Yangians, implying that the coefficients are non-negative integers.

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