On the correlation functions of the characteristic polynomials of the sparse hermitian random matrices

Abstract

We consider asymptotics of the correlation functions of characteristic polynomials corresponding to random weighted G(n, pn) Erd os -- R\'enyi graphs with Gaussian weights in the case of finite p and also when p ∞. It is shown that for finite p the second correlation function demonstrates a kind of transition: when p < 2 it factorizes in the limit n ∞, while for p > 2 there appears an interval (-λ*(p), λ*(p)) such that for λ0 ∈ (-λ*(p), λ*(p)) the second correlation function behaves like that for GUE, while for λ0 outside the interval the second correlation function is still factorized. For p ∞ there is also a threshold in the behavior of the second correlation function near λ0 = 2: for p n2/3 the second correlation function factorizes, whereas for p n2/3 it behaves like that for GUE. For any rate of p ∞ the asymptotics of correlation functions of any even order for λ0 ∈ (-2, 2) coincide with that for GUE.