English

Variance-Gamma approximation via Stein's method

Probability 2014-04-01 v2

Abstract

Variance-Gamma distributions are widely used in financial modelling and contain as special cases the normal, Gamma and Laplace distributions. In this paper we extend Stein's method to this class of distributions. In particular, we obtain a Stein equation and smoothness estimates for its solution. This Stein equation has the attractive property of reducing to the known normal and Gamma Stein equations for certain parameter values. We apply these results and local couplings to bound the distance between sums of the form i,j,k=1m,n,rXikYjk\sum_{i,j,k=1}^{m,n,r}X_{ik}Y_{jk}, where the XikX_{ik} and YjkY_{jk} are independent and identically distributed random variables with zero mean, by their limiting Variance-Gamma distribution. Through the use of novel symmetry arguments, we obtain a bound on the distance that is of order m1+n1m^{-1}+n^{-1} for smooth test functions. We end with a simple application to binary sequence comparison.

Keywords

Cite

@article{arxiv.1309.4422,
  title  = {Variance-Gamma approximation via Stein's method},
  author = {Robert E. Gaunt},
  journal= {arXiv preprint arXiv:1309.4422},
  year   = {2014}
}

Comments

39 pages. Published Version

R2 v1 2026-06-22T01:28:59.796Z