Preservation of reliability classes under the formation of coherent systems

Navarro, Jorge; Aguila, Yolanda del Aguila del; Sordo, Miguel Á.; Suárez‐Llorens, Alfonso

doi:10.1002/asmb.1985

Cited by 74 publications

(84 citation statements)

References 28 publications

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“…This property is not always true (see Navarro and Shaked ). Also, similar results can be derived for systems with dependent identically distributed components by using the conditions given in Navarro et al , (Theorem 2.4) for the hazard rate order and the conditions given in Navarro et al , for the preservation of the DFR class under the formation of the systems.…”

Section: Discussionmentioning

confidence: 55%

“…□ Remark In the proof of Theorem , a system with just one unit ( X ) was used as a ‘facilitator’ to obtain comparisons in the dispersive order when the component lifetimes are DFR. From Theorem and the results given in Navarro et al , , one can use as a ‘facilitator’ any mixed system which preserves the DFR class such as the series systems with i.i.d. components. Remark Under Condition (iii) in Theorem , that is, when the component lifetimes are i.i.d.…”

Section: Systems With Identical Componentsmentioning

confidence: 99%

See 1 more Smart Citation

Comparisons of mixed systems with decreasing failure rate component lifetimes using dispersive order

Toomaj

Doostparast

2014

Appl Stoch Models Bus & Ind

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Because lifetimes of systems are not deterministic, partially, orders are used for comparison purposes which lead us to provide optimal system configurations. This paper deals with a signature-based dispersive ordering of mixed systems. It is assumed that component lifetimes are independent and identically distributed, and the common distribution has a decreasing failure rate function. Some illustrative examples are also given.

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Section: Discussionmentioning

confidence: 55%

Section: Systems With Identical Componentsmentioning

confidence: 99%

Comparisons of mixed systems with decreasing failure rate component lifetimes using dispersive order

Toomaj

Doostparast

2014

Appl Stoch Models Bus & Ind

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“…Remark Still for a binary system with binary components, an alternative representation of the reliability function can be expressed in terms of a distorted distribution, or aggregation, of the marginal survival functions of the different components. The form of such a function of course depends on both the system's structure function ϕ and on the survival copula K of the vector of components' lifetimes (see, in particular, other works). By comparing, for any fixed ϕ , such a copula‐based representation of reliability with the one based on a potential extension of formula , one may establish a relation between the probabilities

double-struckP ((), X_{1 : n} = X_{π false(1 false)}, ⋯, X_{n - 1 : n} = X_{π false(n - 1 false)}, X_{n : n} = X_{π false(n false)})

and

double-struckP ((), T_{S} > t false| X_{1 : n} = X_{π false(1 false)}, ⋯, X_{n - 1 : n} = X_{π false(n - 1 false)}, X_{n : n} = X_{π false(n false)})

on one side and the copula K on the other side.…”

Section: Discussion and Concluding Remarksmentioning

confidence: 99%

Reliability, signature, and relative quality functions of systems under time‐homogeneous load‐sharing models

Spizzichino

2018

Appl Stoch Models Bus & Ind

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For a coherent binary system made of binary components, we consider the assumption that the components' lifetimes are distributed according to a time‐homogeneous, load‐sharing model. Such models are characterized in terms of the so‐called multivariate conditional hazard rate functions. We aim to point out some related properties of the notions of signature, relative quality functions, and reliability functions. On this purpose, we preliminarily collect all the necessary background and review some related literature. This paper concludes with a discussion, also containing some hints for future work.

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“…Hence, by applying the inclusion–exclusion formula to (1), we infer (see, e.g., ) that the system reliability function

{\overset{F}{true}}_{T}

can be written as

{\overset{F}{true}}_{T} (t) = \bar{Q} ({\overset{F}{true}}_{1} (t), \dots, {\overset{F}{true}}_{n} (t))

for all

t

, where

\bar{Q} : {[0, 1]}^{n} \to [0, 1]

is a continuous increasing function such that

\bar{Q} ({bold0}_{n}) = 0

and

\bar{Q} ({bold1}_{n}) = 1

, where

{bold0}_{n}

and

{bold1}_{n}

are the n ‐dimensional vectors

(0, \dots, 0)

and

(1, \dots, 1)

, respectively.

\overset{Q}{true}

is called a generalized distortion (or a continuous aggregation function ).…”

Section: Bounds For Systems With Ordered Componentsmentioning

confidence: 99%

Sharp bounds for the reliability of systems and mixtures with ordered components

Miziuła

Navarro

2017

Naval Research Logistics

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In this article, we study how to derive bounds for the reliability and the expected lifetime of a coherent system with heterogeneous ordered components. These bounds can be used to compare the performance of the systems obtained by permuting the components at a given system structure, that is, to study where we should place the different components at a system structure to get the most reliable system. Moreover, a similar procedure is applied to get bounds for mixtures and for the generalized proportional hazard rate model when the baseline populations are ordered. © 2017 Wiley Periodicals, Inc. Naval Research Logistics 64: 108–116, 2017

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Preservation of reliability classes under the formation of coherent systems

Cited by 74 publications

References 28 publications

Comparisons of mixed systems with decreasing failure rate component lifetimes using dispersive order

Comparisons of mixed systems with decreasing failure rate component lifetimes using dispersive order

Reliability, signature, and relative quality functions of systems under time‐homogeneous load‐sharing models

Sharp bounds for the reliability of systems and mixtures with ordered components

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