Strong renewal theorem and local limit theorem in the absence of regular variation

Abstract

We obtain a strong renewal theorem with infinite mean beyond regular variation, when the underlying distribution belongs to the domain of geometric partial attraction a semistable law with index α∈ (1/2,1]. In the process we obtain local limit theorems for both finite and infinite mean, that is for the whole range α∈ (0,2). We also derive the asymptotics of the renewal function for α∈ (0,1].