A Proof of Basic Limit Theorem of Renewal Theory

Abstract

Let \qn\n=0∞⊂ [0,1] satisfy q0=0, Σn=0∞ qn=1, and \n≥ 1 qn≠ 0\=1. We consider the following process: Let x be a real number. We first set x=0. Then x is increased by i with probability qi~(i=0,1,2,·s) every time. For n≥ 0, let pn be the probability such that x=n occurs, so we have p0=1 and pn=q1pn-1+q2pn-2+·s+qnp0~(n≥ 1). In this setting, we have n pn=1/Σi=0∞ iqi, where we define 1/Σi=0∞ iqi=0 if Σi=0∞ iqi=+∞. This result is known as (discrete case of) Blackwell's renewal theorem. The proof of n pn=1/Σi=0∞ iqi is not trivial, while the meaning of n pn=1/Σi=0∞ iqi is clear since the expected value of increasing number i is Σi=0∞ iqi. Many proofs of this result have been given. In this paper, we will also provide a proof of this result. The idea of our proof is based on Fourier-analytic methods and Tauberian theorems for almost convergent sequences, while we actually need only elementary analysis.