Eve, Adam and the Preferential Attachment Tree

Abstract

We consider the problem of finding the initial vertex (Adam) in a Barab\'asi--Albert tree process (T(n) : n ≥ 1) at large times. More precisely, given >0, one wants to output a subset P (n) of vertices of T(n) so that the initial vertex belongs to P (n) with probability at least 1- when n is large. It has been shown by Bubeck, Devroye & Lugosi, refined later by Banerjee & Huang, that one needs to output at least -1 + o(1) and at most -2 + o(1) vertices to succeed. We prove that the exponent in the lower bound is sharp and the key idea is that Adam is either a ``large degree" vertex or is a neighbor of a ``large degree" vertex (Eve).