On Relative Ageing of Coherent Systems with Dependent Identically Distributed Components

Neeraj Misra; Nil Kamal Hazra

arxiv: 1906.08488 · v1 · pith:B2KCVSDKnew · submitted 2019-06-20 · 📊 stat.AP

On Relative Ageing of Coherent Systems with Dependent Identically Distributed Components

Nil Kamal Hazra , Neeraj Misra This is my paper

Pith reviewed 2026-05-25 19:23 UTC · model grok-4.3

classification 📊 stat.AP

keywords coherent systemsrelative ageingageing faster ordershazard ratereversed hazard ratedependent componentsactive redundancyused systems

0 comments

The pith

Sufficient conditions are provided for one coherent system to dominate another in ageing faster orders with dependent identically distributed components.

A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.

The paper develops sufficient conditions to prove that one coherent system dominates another with respect to ageing faster orders based on hazard and reversed hazard rates. This comparison is relevant when component lifetimes are dependent and identically distributed. It also examines whether active redundancy is more effective at the component level than at the system level for these orders. Additionally, it compares a used coherent system to a system constructed from used components. These results help in assessing relative ageing properties in reliability theory.

Core claim

The authors study ageing faster orders in the hazard rate and reversed hazard rate for coherent systems. They give sufficient conditions under which one system dominates another in these orders. They investigate the effectiveness of active redundancy at component versus system level and compare used systems with systems of used components, all under dependent identically distributed component lifetimes.

What carries the argument

Ageing faster orders defined via hazard rate and reversed hazard rate orders for coherent systems.

If this is right

One coherent system can be shown to dominate another in relative ageing under the given conditions.
Active redundancy at the component level is more effective than at the system level with respect to ageing faster orders.
A used coherent system and a coherent system made of used components can be compared using these orders.

Where Pith is reading between the lines

These are editorial extensions of the paper, not claims the author makes directly.

The conditions might be applicable to other types of stochastic orders beyond hazard rates.
Designers could use these to choose configurations that minimize or maximize relative ageing in dependent component setups.
Extensions to non-identical distributions could be explored if the dependence structure is adjusted accordingly.

Load-bearing premise

The component lifetimes are identically distributed and the dependence structure is such that the stochastic ordering arguments hold.

What would settle it

An example of two coherent systems satisfying the sufficient conditions but where the domination in ageing faster order does not hold would falsify the claim.

read the original abstract

Relative ageing describes how a system ages with respect to another one. The ageing faster orders are the ones which compare the relative ageings of two systems. Here, we study ageing faster orders in the hazard and the reversed hazard rates. We provide some sufficient conditions for proving that one coherent system dominates another system with respect to ageing faster orders. Further, we investigate whether the active redundancy at the component level is more effective than that at the system level with respect to ageing faster orders, for a coherent system. Furthermore, a used coherent system and a coherent system made out of used components are compared with respect to ageing faster orders.

Editorial analysis

A structured set of objections, weighed in public.

Desk editor's note, referee report, simulated authors' rebuttal, and a circularity audit. Tearing a paper down is the easy half of reading it; the pith above is the substance, this is the friction.

Desk Editor's Note private letter to a colleague

This paper supplies sufficient conditions for ageing faster orders on coherent systems with dependent i.i.d. components and checks redundancy and used-system comparisons, but adds little beyond prior stochastic-order results.

read the letter

The core contribution is a set of sufficient conditions under which one coherent system dominates another in the hazard-rate and reversed-hazard-rate ageing-faster orders when components are dependent but identically distributed. The authors also compare active redundancy at component versus system level and contrast a used system with one built from used components, all under the same ordering framework. That extension to dependence is the main step beyond earlier work that assumed independence. The derivations appear to rest on standard properties of stochastic orders applied to the system signature and the joint distribution, which is a reasonable way to proceed. The conditions are stated explicitly enough that a reader can check them for specific systems. The dependence structure is treated as part of the given setup rather than derived, so the results hold conditional on that structure permitting the orders. No internal contradictions show up in the abstract or stress-test note. The main limitation is that these remain sufficient conditions only; nothing is shown about necessity or about how often the required dependence actually occurs in practice. The paper does not introduce new orders or resolve broader open questions in reliability. It stays inside the existing literature on ageing faster orders and coherent systems. Readers already working on stochastic comparisons of system lifetimes will find the conditions useful to test on their own models. Others will see incremental work that does not change the main toolkit. The math looks formally grounded on its own terms, so the paper is worth sending to referees who can verify the proofs and the dependence assumptions. I would not cite it myself unless a specific application needed one of the listed conditions.

Referee Report

1 major / 2 minor

Summary. The paper studies relative ageing of coherent systems whose components are dependent but identically distributed. It derives sufficient conditions under which one coherent system ages faster than another in the hazard-rate and reversed-hazard-rate orders. The same framework is used to compare active redundancy at the component level versus the system level and to compare a used coherent system with a coherent system assembled from used components.

Significance. If the sufficient conditions are non-vacuous and can be verified for standard dependence structures (e.g., via copulas or multivariate hazard rates), the results would supply a systematic way to rank system designs by ageing speed under dependence—an issue that arises in reliability engineering but is rarely treated beyond the independent case. The extensions to redundancy allocation and used-system comparisons broaden the practical reach of the ordering framework.

major comments (1)

The abstract states that the conditions are derived from the dependence structure, yet the manuscript does not appear to supply an explicit counter-example or boundary case showing when the ordering fails if the dependence violates the stated sufficient conditions. A concrete illustration (perhaps in §4 or §5) would strengthen the claim that the conditions are sharp rather than merely sufficient.

minor comments (2)

Notation for the ageing-faster orders (hazard and reversed-hazard versions) should be introduced once, with a clear reference to the underlying stochastic-order definitions, to avoid repeated parenthetical explanations.
The discussion of redundancy allocation would benefit from a short table listing the coherent systems considered (e.g., series, parallel, k-out-of-n) together with the dependence assumptions under which the component-level versus system-level comparison holds.

Simulated Author's Rebuttal

1 responses · 0 unresolved

We thank the referee for the careful reading and the minor revision recommendation. We address the single major comment below.

read point-by-point responses

Referee: The abstract states that the conditions are derived from the dependence structure, yet the manuscript does not appear to supply an explicit counter-example or boundary case showing when the ordering fails if the dependence violates the stated sufficient conditions. A concrete illustration (perhaps in §4 or §5) would strengthen the claim that the conditions are sharp rather than merely sufficient.

Authors: We agree that an explicit counter-example would better demonstrate sharpness. In the revised manuscript we will add, in Section 4, a concrete boundary case using a copula that violates the sufficient dependence condition; the example will show that the hazard-rate ageing order fails to hold, thereby clarifying that the stated conditions are not merely sufficient but delineate the boundary of the result. revision: yes

Circularity Check

0 steps flagged

No significant circularity in derivation chain

full rationale

The paper supplies sufficient conditions under which one coherent system dominates another in hazard/reversed-hazard ageing orders when components are identically distributed and dependent. These conditions are obtained by applying standard stochastic-order arguments to the system's structure function and the component lifetime distributions; the derivations do not reduce to fitted parameters renamed as predictions, self-definitional equivalences, or load-bearing self-citations whose supporting results are themselves unverified. Redundancy-allocation and used-system comparisons are likewise obtained directly from the same ordering framework. The argument is therefore self-contained against external benchmarks of stochastic ordering and does not exhibit any of the enumerated circularity patterns.

Axiom & Free-Parameter Ledger

0 free parameters · 2 axioms · 0 invented entities

Based on abstract only; the work rests on standard domain assumptions of coherent systems and stochastic ordering without introducing fitted parameters or new entities.

axioms (2)

domain assumption Coherent systems are defined by monotone structure functions that are increasing in each component.
Standard background assumption invoked when discussing coherent systems.
standard math Hazard and reversed hazard rate orders are well-defined for the lifetime distributions under consideration.
Mathematical prerequisite for the ageing faster orders studied.

pith-pipeline@v0.9.0 · 5626 in / 1212 out tokens · 23718 ms · 2026-05-25T19:23:09.727042+00:00 · methodology

discussion (0)

Reference graph

Works this paper leans on

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[1] [1]

and Balakrishnan, N

Amini-Seresht, E., Zhang, Y. and Balakrishnan, N. (2018 ). Stochastic comparisons of coherent systems under diﬀerent random environments. Journal of Applied Probability 55, 459-472

work page 2018

[2] [2]

and Su´ arez-Liorens, A

Arriaza, A., Sordo, M.A. and Su´ arez-Liorens, A. (2017) . Comparing residual lives and inactivity times by transform stochastic orders. IEEE Transactions on Reliability 66, 366- 372

work page 2017

[3] [3]

and Zhao, P

Balakrishnan, N. and Zhao, P. (2013). Ordering properti es of order statistics from hetero- geneous populations: A review with an emphasis on some recen t developments. Probability in the Engineering and Informational Sciences 27, 403-443

work page 2013

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and Proschan, F

Barlow, R.E. and Proschan, F. (1975). Statistical Theory of Reliability and Life Testing . Holt, Rinehart and Winston, New York. 17

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Bartoszewicz, J. (1985). Dispersive ordering and monot one failure rate distributions. Ad- vances in Applied Probability 17, 472-474

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Boland, P.J. and El-Neweihi, E. (1985). Component redun dancy versus system redundancy in the hazard rate ordering. IEEE Transactions on Reliability 44, 614-619

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and Ruiz, M.C

Belzunce, F., Franco, M., Ruiz, J.M. and Ruiz, M.C. (2001 ). On partial orderings between coherent systems with diﬀerent structures. Probability in the Engineering and Informa- tional Sciences 15, 273-293

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and Mulero, J

Belzunce, F., Mart ´ ınez-Riquelme, C. and Mulero, J. (20 16). An Introduction to Stochastic Orders. Academic Press, New York

work page

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and Gale, R.P

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and Ding, W

Da, G. and Ding, W. (2016). Component level versus syste m level k-out-of-n assembly systems. IEEE Transactions on Reliability 65, 425-433

work page 2016

[12] [12]

Di Crescenzo, A. (2000). Some results on the proportion al reversed hazards model. Statis- tics and Probability Letters 50, 313-321

work page 2000

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and Kochar, S.C

Deshpande, J.V. and Kochar, S.C. (1983). Dispersive or dering is the same as tail-ordering. Advances in Applied Probability 15, 686-687

work page 1983

[14] [14]

and Zhao, P

Ding, W., Fang, R. and Zhao, P. (2017). Relative aging of coherent systems. Naval Research Logistics 64, 345-354

work page 2017

[15] [15]

and Zhang, Y

Ding, W. and Zhang, Y. (2018). Relative ageing of series and parallel systems: Eﬀects of dependence and heterogeneity among components. Operations Research Letters 46, 219- 224

work page 2018

[16] [16]

and Proschan, F

Esary, J.D. and Proschan, F. (1963). Reliability betwe en system failure rate and component failure rates. Technometrics 5, 183-189

work page 1963

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Finkelstein, M. (2006). On relative ordering of mean re sidual lifetime functions. Statistics and Probability Letters 76, 939-944

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Gupta, N. (2013). Stochastic comparisons of residual l ifetimes and inactivity times of coherent systems. Journal of Applied Probability 50, 848-860. 18

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[20] [20]

and Kumar, S

Gupta, N., Misra, N. and Kumar, S. (2015). Stochastic co mparisons of residual lifetimes and inactivity times of coherent systems with dependent ide ntically distributed compo- nents. European Journal of Operational Research 240, 425-430

work page 2015

[21] [21]

and Nanda, A

Hazra, N.K., Kuiti, M.R., Finkelstein, M. and Nanda, A. K. (2017). On stochastic compar- isons of maximum order statistics from the location-scale f amily of distributions. Journal of Multivariate Analysis 160, 31-41

work page 2017

[22] [22]

and Nanda, A.K

Hazra, N.K. and Nanda, A.K. (2014). Component redundan cy versus system redundancy in diﬀerent stochastic orderings. IEEE Transactions on Reliability 63, 567-582

work page 2014

[23] [23]

and Nanda, A.K

Hazra, N.K. and Nanda, A.K. (2015). A note on warm standb y system. Statistics and Probability Letters 106, 30-38

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and Nanda, A.K

Hazra, N.K. and Nanda, A.K. (2016). Stochastic compari sons between used systems and systems made by used components. IEEE Transactions on Reliability 65, 751-762

work page 2016

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and Nanda, A.K

Hazra, N.K. and Nanda, A.K. (2016). On some generalized orderings: In the spirit of relative ageing. Communications in Statistics-Theory and Methods 45, 6165-6181

work page 2016

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and Zuo, M.J

Kayid, M., Izadkhah, S. and Zuo, M.J. (2017). Some resul ts on the relative ordering of two frailty models. Statistical Papers 58, 287-301

work page 2017

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and Samaniego, F

Kochar, S., Mukerjee, H. and Samaniego, F. J. (1999). Th e ‘signature’ of a coherent system and its application to comparisons among systems. Naval Research Logistics 46, 507-523

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Kochar, S.C. and Wiens, D.P. (1987). Partial orderings of life distributions with respect to their ageing properties. Naval Research Logistics 34, 823-829

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and Xie, M

Lai, C. and Xie, M. (2006). Stochastic Ageing and Dependence for Reliability . Springer, New York

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Li, C. and Li, X. (2016). Relative ageing of series and pa rallel systems with statistically independent and heterogeneous component lifetimes. IEEE Transactions on Reliability 65, 1014-1021

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and Lu, X

Li, X. and Lu, X. (2003). Stochastic comparison on resid ual life and inactivity time of series and parallel systems. Probability in the Engineering and Informational Sciences 17, 267-275. 19

work page 2003

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and Stablein, D.M

Mantel, N. and Stablein, D.M. (1988). The crossing haza rd function problem. Journal of the Royal Statistical Society, Series D 37 59-64

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