Blackwell-type Theorems for Weighted Renewal Functions

Abstract

For a numerical sequence an satisfying broad assumptions on its "behaviour on average" and a random walk Sn=1 +...+n with i.i.d. jumps j with positive mean μ, we establish the asymptotic behaviour of the sums [Σn 1 an (Sn∈[x, x+)) as x ∞,] where >0 is fixed. The novelty of our results is not only in much broader conditions on the weights an, but also in that neither the jumps j nor the weights aj need to be positive. The key tools in the proofs are integro-local limit theorems and large deviation bounds. For the jump distribution F, we consider conditions of four types: (a) the second moment of j is finite, (b) F belongs to the domain of attraction of a stable law, (c) the tails of F belong to the class of the so-called locally regularly varying functions, (d) F satisfies the moment Cram\'er condition. Regarding the weights, in cases (a)--(c) we assume that an is a so-called -locally constant on average sequence, (n) being the scaling factor ensuring convergence of the distributions of (Sn - μ n)/ (n) to the respective stable law. In case (d) we consider sequences of weights of the form an=bn eqn, where bn has the properties assumed about the sequence an in cases (a)--(c) for (n)=n.