The Correlated Jacobi and the Correlated Cauchy-Lorentz ensembles
arXiv:1505.00675 · doi:10.1007/s10955-015-1416-5
Abstract
We calculate the $k$-point generating function of the correlated Jacobi ensemble using supersymmetric methods. We use the result for complex matrices for $k=1$ to derive a closed-form expression for eigenvalue density. For real matrices we obtain the density in terms of a twofold integral that we evaluate numerically. For both expressions we find agreement when comparing with Monte Carlo simulations. Relations between these quantities for the Jacobi and the Cauchy-Lorentz ensemble are derived.
29 pages, 3 figures