Configurational Temperature in Matrix Models and Random Matrix Ensembles

Abstract

We investigate the configurational temperature estimator in interacting matrix models and Gaussian random-matrix ensembles. The estimator follows from an exact Schwinger--Dyson identity and may be expressed in terms of the gradient and Hessian of the action. We study the Gross--Witten--Wadia model, a quartic double-well matrix model, and the Gaussian Orthogonal, Unitary, and Symplectic Ensembles. In all cases, the estimator satisfies the exact Schwinger--Dyson identity, β config = 1, within statistical uncertainties. Separating the estimator into isotropic and anisotropic parts, we find that the leading finite-N corrections satisfy the approximate relation β iso - 1 - β aniso. We also show that the configurational temperature estimator provides a sensitive diagnostic of Monte Carlo simulations.