An asymptotic formula for the number of integral matrices with a fixed characteristic polynomial via orbital integrals

Abstract

For an irreducible polynomial (x)∈ Ok[x] of degree n, where k is a number field and Ok its ring of integers, let N(X, T) denote the number of n × n integral matrices whose characteristic polynomial is (x), bounded by a positive real number T with respect to a certain norm. In this paper, we provide an asymptotic formula for N(X,T) as T ∞ in terms of the orbital integrals of gln. This result extends the work of A. Eskin, S. Mozes, and N. Shah EMS (1996) to a broader setting, thereby further developing the generalization initiated by the second author in arXiv:2509.22314. Our approach is based on the interpretation of local Brauer evaluations for X via local class field theory, and on the Langlands-Shelstad fundamental lemma for sln. In particular, we observe that local Brauer evaluations for X determine local endoscopic data for SLn, suggesting a deeper conceptual connection between these two notions.

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