On some properties of distributions possessing a bathtub-shaped failure rate average
Article Type
Research Article
Publication Title
Journal of Applied Probability
Abstract
The life distribution of a device subject to shocks governed by a homogeneous Poisson process is shown to have a bathtub failure rate average (BFRA) when the probabilities of surviving k shocks possess the corresponding discrete property. We prove closure under the formation of weak limits for BFRA distributions and explore related moment convergence issues within the BFRA family. Similar results for increasing and decreasing failure rate average distributions are obtained either independently or as consequences of our results. We also establish some results outlining the positions of various non-monotonic ageing classes such as bathtub failure rate, increasing initially then decreasing mean residual life, new worse then better than used in expectation, and increasing initially then decreasing mean time to failure in the hierarchy. Finally, an open problem is posed and a partial solution provided.
First Page
693
Last Page
708
DOI
https://10.1017/jpr.2022.87
Publication Date
1-1-2023
Recommended Citation
Khan, Ruhul Ali; Bhattacharyya, Dhrubasish; and Mitra, Murari, "On some properties of distributions possessing a bathtub-shaped failure rate average" (2023). Journal Articles. 3965.
https://digitalcommons.isical.ac.in/journal-articles/3965