Eigenvalue Distribution of p-adic Random Matrices Among Algebraic Extensions, with an Analogue for p-adic Random Polynomials

Abstract

We study the distribution of eigenvalues of Haar-random matrices over Zp among algebraic extensions of Qp. Our results give p-adic analogues of the real-eigenvalue counting results of Edelman-Kostlan-Shub for the real Ginibre ensemble, but with a different degree behavior: while real eigenvalues form only a vanishing proportion in the real Ginibre ensemble, p-adic eigenvalues are asymptotically evenly distributed among possible extension degrees. We also show that the maximal unramified extension Qpun captures all but a bounded expected number of eigenvalues, and that the expected number of eigenvalues outside Qpun has a finite positive limit with an explicit upper bound. The proof uses correlation function formulas from the author's previous joint work with Van Peski (arXiv:2601.06283), together with uniform estimates over varying finite extensions. We also prove analogous results for roots of random Haar polynomials over Zp, using the correlation function formulas of Caruso (arXiv:2110.03942). These polynomial results are p-adic analogues of the real-root counting results of Edelman-Kostlan, again with behavior different from the real setting.