On high moments of strongly diluted large Wigner random matrices

Abstract

We consider a dilute version of the Wigner ensemble of nxn random matrices H and study the asymptotic behavior of their moments M2s in the limit of infinite n, s and , where is the dilution parameter. We show that in the asymptotic regime of the strong dilution, the moments M2s with s= depend on the second and the fourth moments of the random entries Hij and do not depend on other even moments of Hij. This fact can be regarded as an evidence of a new type of the universal behavior of the local eigenvalue distribution of strongly dilute random matrices at the border of the limiting spectrum. As a by-product of the proof, we describe a new kind of Catalan-type numbers related with the tree-type walks.