Abstract
Industrial revolution leads to the manufacturing of multicomponent products; to guarantee the sufficiency of the product and consumer satisfaction, the producer has to study the lifetime of the products. This leads to the use of bivariate and multivariate lifetime distributions in reliability engineering. The most popular and applicable is Marshall–Olkin family of distributions. In this paper, a new bivariate lifetime distribution which is the bivariate inverted Kumaraswamy (BIK) distribution is found and its properties are illustrated. Estimation using both maximum likelihood and Bayesian approaches is accomplished. Using different selection criteria, it is found that BIK provides the best performance compared with other bivariate distributions like bivariate exponential and bivariate inverse Weibull distributions. As a generalization, the multivariate inverted Kumaraswamy (MIK) distribution is derived. Few studies have been conducted on the multivariate Marshall–Olkin lifetime distributions. To the best of our knowledge, none of them handle estimation process. In this paper, we developed an algorithm to show how to estimate the unknown parameters of MIK using both maximum likelihood and Bayesian approaches. This algorithm could be applied in estimating other Marshall–Olkin multivariate lifetime distributions.
Highlights
Global competition in combination with using higher manufacturing technologies results in producing two or multicomponent products. is led to the use of bivariate and multivariate distributions in reliability engineering
Estimating the unknown parameters of a certain multivariate MO distribution is very important, no one in the literature was interested in it. erefore, we will consider the process of estimation for multivariate inverted Kumaraswamy (MIK) parameters. e proposed techniques could be applied for any multivariate MO distribution
Bivariate inverted Kumaraswamy (BIK) distribution is derived as a new member of bivariate Marshall–Olkin family
Summary
Global competition in combination with using higher manufacturing technologies results in producing two or multicomponent products. is led to the use of bivariate and multivariate distributions in reliability engineering. Mathematical Problems in Engineering and Gupta [11] derived the multivariate generalized linear failure rate and multivariate inverse Weibull distributions, respectively. Kundu and Gupta [6], Muhammed [9], Aly et al [12], Eliwa and El-Morshedy [13], El-Morshedy et al [14], and Sarhan [4, 5, 15] estimated the unknown parameters using maximum likelihood approach for different bivariate lifetime distributions.
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