Dependence comparisons of order statistics in the proportional hazards model

Abstract

Let X1, … , Xn be mutually independent exponential random variables with distinct hazard rates λ1, … , λn > 0 and let Y1, …, Yn be a random sample from the exponential distribution with hazard rate = Σi=1n i/n. Also let X1:n < ·s < Xn:n and Y1:n < ·s < Yn:n be their associated order statistics. It is shown that for 1 i <j n, the generalized spacing Xj:\, n - Xi:\, n is more dispersed than Yj:\,n - Yi:\, n according to dispersive ordering. This result is used to solve a long standing open problem that for 2 i n the dependence of Xi:\, n on X1:\, n is less than that of Yi: \, n on Y1\, :n, in the sense of the more stochastically increasing. This dependence result is also extended to the PHR model. This extends the earlier work of Genest, Kochar and Xu[ J.\ Multivariate Anal.\ 100 (2009) \ 1587-1592] who proved this result for i =n.