Department of Mathematical Sciences, Shahid Beheshti University, G.C. Evin, Tehran, Iran.
Abstract
In this paper, we discuss the usual stochastic, likelihood ratio, dispersive and convex transform order between two parallel systems with independent heterogeneous extended generalized exponential components. We also establish the usual stochastic order between series systems from two independent heterogeneous extended generalized exponential samples. Finally, we find lower and upper bounds for the Renyi entropy and cumulative residual entropy of series and parallel systems.
Payandeh Najafabadi,A. T. . &. and Barmalzan,&. (2022). Stochastic Comparisons of Series and Parallel Systems with Heterogeneous Extended Generalized Exponential Components. Journal of the Iranian Statistical Society, 15(1), 45-58.
MLA
Payandeh Najafabadi,A. T. . &. , and Barmalzan,&. . "Stochastic Comparisons of Series and Parallel Systems with Heterogeneous Extended Generalized Exponential Components", Journal of the Iranian Statistical Society, 15, 1, 2022, 45-58.
HARVARD
Payandeh Najafabadi A. T. . &., Barmalzan &. (2022). 'Stochastic Comparisons of Series and Parallel Systems with Heterogeneous Extended Generalized Exponential Components', Journal of the Iranian Statistical Society, 15(1), pp. 45-58.
CHICAGO
A. T. . &. Payandeh Najafabadi and &. Barmalzan, "Stochastic Comparisons of Series and Parallel Systems with Heterogeneous Extended Generalized Exponential Components," Journal of the Iranian Statistical Society, 15 1 (2022): 45-58,
VANCOUVER
Payandeh Najafabadi A. T. . &., Barmalzan &. Stochastic Comparisons of Series and Parallel Systems with Heterogeneous Extended Generalized Exponential Components. JIRSS, 2022; 15(1): 45-58.
Journal of the Iranian Statistical Society