Asymptotics of the partition function of a Laguerre-type random matrix model
arXiv:1304.4782
Abstract
We study asymptotics of the partition function $Z_N$ of a Laguerre-type random matrix model when the matrix order $N$ tends to infinity. By using the Deift-Zhou steepest descent method for Riemann-Hilbert problems, we obtain an asymptotic expansion of $\log Z_N$ in powers of $N^{-2}$.
29 pages with 4 figures