Limit theorems for pure death processes coming down from infinity

Abstract

We consider a pure death process (Z(t), t0) with death rates λn satisfying the condition Σn=2∞ λn-1<∞ of coming from infinity, Z(0)=∞, down to an absorbing state n=1. We establish limit theorems for Z(t) as t0, which strengthen the results that can be extracted from [1]. We also prove a large deviation theorem assuming that λn regularly vary as n∞ with an index β>1. It generalises a similar statement with β=2 obtained in [4] for λn=n 2.