A Geometric(1/2) Distribution Associated with Record Breaking

Abstract

Let Xi,i=0,1,… be a sequence of iid random variables whose distribution is continuous. Associated with this sequence is the sequence (i,Xi),i=0,1,…. Let Rn denote the set of Pareto optimal elements of \ (i,Xi):i=0,…,n\. We refer to the elements of Rn as the current records at time n, and we define Rn= Rn, the number of such records. Observe that Rn has \1,…,n+1\ as its support. When (n,Xn) is realized, it is a Pareto optimal element of \ (i,Xi)~:~i=0,…,n\ and Rn (n,Xn) ⊂ Rn-1. Then we refer to those elements of Bn = Rn-1 Rn as the records broken at time n. Let Bn= Bn . We show that P[Bn = k] → 1/2k+1 for k=0,1,2,….