Renewal Processes Represented as Doubly Stochastic Poisson Processes

Abstract

This paper gives an elementary proof for the following theorem: a renewal process can be represented by a doubly-stochastic Poisson process (DSPP) if and only if the Laplace-Stieltjes transform of the inter-arrival times is of the following form: φ(θ)=λ[λ+θ+k∫0∞(1-e-θ z)\,dG(z)]-1, for some positive real numbers λ, k, and some distribution function G with G(∞)=1. The intensity process (t) of the corresponding DSPP jumps between λ and 0, with the time spent at λ being independent random variables that are exponentially distributed with mean 1/k, and the time spent at 0 being independent random variables with distribution function G.