Blackwell-type Theorems for Weighted Renewal Functions
Abstract
For a numerical sequence satisfying broad assumptions on its "behaviour on average" and a random walk with i.i.d. jumps with positive mean , we establish the asymptotic behaviour of the sums [\sum_{n\ge 1} a_n \pr (S_n\in[x, x+\D)) \quad as \quad x\to \infty,] where is fixed. The novelty of our results is not only in much broader conditions on the weights , but also in that neither the jumps nor the weights need to be positive. The key tools in the proofs are integro-local limit theorems and large deviation bounds. For the jump distribution , we consider conditions of four types: (a) the second moment of is finite, (b) belongs to the domain of attraction of a stable law, (c) the tails of belong to the class of the so-called locally regularly varying functions, (d) satisfies the moment Cram\'er condition. Regarding the weights, in cases (a)--(c) we assume that is a so-called -locally constant on average sequence, being the scaling factor ensuring convergence of the distributions of to the respective stable law. In case (d) we consider sequences of weights of the form where has the properties assumed about the sequence in cases (a)--(c) for
Cite
@article{arxiv.1201.0836,
title = {Blackwell-type Theorems for Weighted Renewal Functions},
author = {Alexander A. Borovkov and Konstantin A. Borovkov},
journal= {arXiv preprint arXiv:1201.0836},
year = {2012}
}
Comments
24 pages; fixed (bad) typos in the statements of Theorem 2.1, 2.2; made a couple of further small changes (e.g. in the statement of Theorem 4.1)