Bounds for asymptotic characters of simple Lie groups

Abstract

An important function attached to a complex simple Lie group G is its asymptotic character X(λ,x) (where λ,x are real (co)weights of G) - the Fourier transform in x of its Duistermaat-Heckman function DHλ(p) (continuous limit of weight multiplicities). It is shown in arXiv:2312.03101 that the best λ-independent upper bound -c(G) for infx ReX(λ,x) for fixed λ is strictly negative. We quantify this result by providing a lower bound for c(G) in terms of G. We also provide upper and lower bounds for DHλ(0) when |λ|=1. This allows us to show that |X(λ,x)| C(G)|λ|-1|x|-1 for some constant C(G) depending only on G, which implies the conjecture in Remark 17.16 of arXiv:2312.03101. We also show that c(SLn) (4π2)n-2. Finally, in the appendix, which subsumes our previous paper arXiv:1811.05293, we prove Conjecture 1 in arXiv:1706.02793 about Mittag-Leffler type sums for G.

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