On the growth of components with non fixed excesses

Abstract

Denote by an l-component a connected graph with l edges more than vertices. We prove that the expected number of creations of (l+1)-component, by means of adding a new edge to an l-component in a randomly growing graph with n vertices, tends to 1 as l,n tends to ∞ but with l = o(n1/4). We also show, under the same conditions on l and n, that the expected number of vertices that ever belong to an l-component is (12l)1/3 n2/3.