Integrability and singularities of Harish-Chandra characters

Abstract

Let G be a reductive group over a local field F of characteristic 0. By Harish-Chandra's regularity theorem, the character π of an irreducible, admissible representation π of G is given by a locally integrable function θπ on G. It is a natural question whether θπ has better integrability properties, namely, whether it is locally L1+ε-integrable for some ε>0. It turns out that the answer is positive, and this gives rise to a new singularity invariant of representations ε(π):=\ ε:θπ∈ LLoc1+ε(G)\ , which we explore in this paper. We provide a lower bound on ε(π) which depends only on the absolute root system of G, and explicitly determine ε(π) in the case of a p-adic GLn. This is done by studying integrability properties of the Fourier transforms O of stable Richardson nilpotent orbital integrals O. We express ε(O) as the log-canonical threshold of a suitable relative Weyl discriminant, and use a resolution of singularities algorithm coming from the theory of hyperplane arrangements, to compute it in terms of the partition associated with the orbit. We obtain several applications; firstly, we provide bounds on the multiplicities of K-types in irreducible representations of G in the p-adic case, where K is an open compact subgroup. We further obtain bounds on the multiplicities of the irreducible representations appearing in the space L2(K/L), where K is a compact simple Lie group, and L≤ K is a Levi subgroup. Finally, we discover surprising applications in random matrix theory, namely to the study of the eigenvalue distribution of powers of random unitary matrices.

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