Classical and Bayesian inferences on the stress-strength reliability $ {R = P[Y < X < Z]} $ in the geometric distribution setting

Abstract: <abstract><p>The subject matter described herein includes the analysis of the stress-strength reliability of the system, in which the discrete strength of the system is impacted by two random discrete stresses. The reliability function of such systems is denoted by $ R = P[Y &lt; X &lt; Z] $, where $ X $ is the strength of the system and $ Y $ and $ Z $ are the stresses. We look at how $ X $, $ Y $ and $ Z $ fit into a well-known discrete distribution known as the geometric distribution. Th… Show more

Inferences on stress-strength reliability $$R=\text{ P }[Y<X<Z]$$ for progressively type-II censored Weibull half logistic distribution

Inferences on stress-strength reliability $$R=\text{ P }[Y<X<Z]$$ for progressively type-II censored Weibull half logistic distribution

Analyzing stress-strength reliability $$\delta =\text{ P }[U<V<W]$$: a Bayesian and frequentist perspective with Burr-XII distribution under progressive Type-II censoring