Replica theory for the rate functional of the empirical spectral distribution function of diluted Hermitian matrices

Abstract

We develop a replica-based framework for the scaled cumulant-generating functional of the empirical spectral distribution function iC of diluted Hermitian random matrices. Within a replica-symmetric saddle-point assumption, this construction yields a candidate rate functional for fluctuations of iC. As an illustrative application, we consider adjacency matrices of unweighted Erdős-Rényi random graphs with mean degree c. We derive explicit expressions for the first two cumulants of iC, indicate how higher cumulants can be obtained from further functional derivatives, and compute the rate function of Fourier coefficients, equivalently of selected linear spectral statistics. The replica-symmetric predictions are tested against exact numerical diagonalization and show good agreement in the accessible fluctuation regime. The approach provides a basis for studying rate functionals of spectral observables in sparse random matrix ensembles.