Some asymptotic properties of the spectrum of the Jacobi ensemble

Abstract

For the random eigenvalues with density corresponding to the Jacobi ensemble c · Πi < j | λi - λj |β Πni=1 (2 - λi)a (2 + λi)b I(-2,2) (λi) (a, b > -1, β > 0) a strong uniform approximation by the roots of the Jacobi polynomials is derived if the parameters a, b, β depend on n and n ∞. Roughly speaking, the eigenvalues can be uniformly approximated by roots of Jacobi polynomials with parameters ((2a+2)/β -1, (2b+2)/β-1), where the error is of order \ n/(a+b) \1/4. These results are used to investigate the asymptotic properties of the corresponding spectral distribution if n ∞ and the parameters a, b and β vary with n. We also discuss further applications in the context of multivariate random F-matrices.