Stress-Strength Reliability Estimation of Time-Dependent Models with Fixed Stress and Phase Type Strength Distribution
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Publication:5009669
DOI10.15446/RCE.V44N1.86519zbMath1470.62148OpenAlexW3161656073MaRDI QIDQ5009669
Publication date: 5 August 2021
Published in: Revista Colombiana de Estadística (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.15446/rce.v44n1.86519
exponential distributionEM algorithmWeibull distributionGamma distributionphase type distributionstress-strength reliability
Cites Work
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- Interval estimation of for generalized Pareto distribution
- Inference about reliability parameter with gamma strength and stress
- Estimation of \(R=P(Y<X)\) for three-parameter Weibull distribution
- Estimation of \(P[Y<X\) for generalized Pareto distribution]
- Burr-XII Distribution Parametric Estimation and Estimation of Reliability of Multicomponent Stress-Strength
- Fisher information and statistical inference for phase-type distributions
- Analysis of R-out-of-N repairable systems: the case of phase-type distributions
- A study of stress-strength reliability using a generalization of power transformed half-logistic distribution
- Phase type stress–strength models with reliability applications
- Classical and Bayesian Estimation of Reliability in Multicomponent Stress-Strength Model Based on Weibull Distribution
- Estimation of the Reliability of a Stress-Strength System from Power Lindley Distributions
- Estimation of Pr(X < Y) Using Record Values in the One and Two Parameter Exponential Distributions
- A note on the Weibull Renewal Process
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