On stochastic orderings between distributions and their sample spacings

Let X1: n6X2 : n6 • • • 6Xn : n denote the order statistics of a random sample of size n from a probability distribution with distribution function F. Similarly, let Y1: m6Y2:m6 • • • 6Ym : m denote the order statistics of an independent random sample of size m from another distribution with distrib

The calculation of physical quantities by lattice QCD simulations requires in some important cases the determination of the inverse of a very large matrix. In this article we describe how stochastic estimator methods can be applied to this problem, and how such techniques can be eciently implemented

Recently, Bartoszewicz (1999, Statist. Probab. Lett. 42, 207-212), has given characterizations of stochastic orders based on the Laplace transform and obtained moment inequalities for ordered distributions. In this note, we give some relations between these orders and inÿnitely divisible distributio