Open Access
May 2018 Some unified results on stochastic properties of residual lifetimes at random times
Neeraj Misra, Sameen Naqvi
Braz. J. Probab. Stat. 32(2): 422-436 (May 2018). DOI: 10.1214/16-BJPS348

Abstract

The residual life of a random variable $X$ at random time $\Theta$ is defined to be a random variable $X_{\Theta}$ having the same distribution as the conditional distribution of $X-\Theta$ given $X>\Theta$ (denoted by $X_{\Theta}=(X-\Theta|X>\Theta)$). Let $(X,\Theta_{1})$ and $(Y,\Theta_{2})$ be two pairs of jointly distributed random variables, where $X$ and $\Theta_{1}$ (and, $Y$ and $\Theta_{2}$) are not necessarily independent. In this paper, we compare random variables $X_{\Theta_{1}}$ and $Y_{\Theta_{2}}$ by providing sufficient conditions under which $X_{\Theta_{1}}$ and $Y_{\Theta_{2}}$ are stochastically ordered with respect to various stochastic orderings. These comparisons have been made with respect to hazard rate, likelihood ratio and mean residual life orders. We also study various ageing properties of random variable $X_{\Theta_{1}}$. By considering this generalized model, we generalize and unify several results in the literature on stochastic properties of residual lifetimes at random times. Some examples to illustrate the application of the results derived in the paper are also presented.

Citation

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Neeraj Misra. Sameen Naqvi. "Some unified results on stochastic properties of residual lifetimes at random times." Braz. J. Probab. Stat. 32 (2) 422 - 436, May 2018. https://doi.org/10.1214/16-BJPS348

Information

Received: 1 July 2016; Accepted: 1 December 2016; Published: May 2018
First available in Project Euclid: 17 April 2018

zbMATH: 06914681
MathSciNet: MR3787760
Digital Object Identifier: 10.1214/16-BJPS348

Keywords: Hazard rate order , likelihood ratio order , mean residual life order , reversed hazard rate order

Rights: Copyright © 2018 Brazilian Statistical Association

Vol.32 • No. 2 • May 2018
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