On some estimates for Erd\"os-R\`enyi random graph

Abstract

We consider a number n of components in a random graph G(n,p) with n vertices, where the probability of an edge is equal to p. By operating with special generating functions we shows the next asymptotic relation for factorial moments of n: E(n-1) s = (1+o(1))( 1p Σk=1∞kk-2k!(npqn)k)s + o(1) as n tends to ∞ and q=1-p. And the following inequations hold: 1-2nqn-1 pn1nqn, 1-1nqn pin nqn-1, where pn is the probability that G(n,p) is connected and pin is the probability that G(n,p) has an isolated vertex.