References
- Asadi, M., Bayramoglu, I. (2006). The mean residual life function of k-out-of-n structure at system level. IEEE Trans. Reliab. 55:314–318.
- David, H., Nagaraja, H.N. (2003). OrderStatistics. 3rd ed. Hoboken, New Jersey: John Wiley and Sons.
- Eryilmaz, S. (2012). On the mean residual life of a k-out-of-n: G system with a single cold standby component. Eur. J. Oper. Res. 222(2):273–277.
- Eryilmaz, S. (2014). A study on reliability of coherent systems equipped with a cold standby component. Metrika 77(3):349–359.
- Eryilmaz, S., Tank, F. (2012). On reliability analysis of a two-dependent-unit series system with a standby unit. Appl. Math. Comput. 218:7792–7797.
- Franko, C., Ozkut, M., Kan, C. (2015). Reliability of coherent systems with a single cold standby component. J. Comput. Appl. Math. 281:230–238.
- Kochar, S. (1999). On stochastic orderings between distributions and their sample spacings. Stat. Probab. Lett. 42:345–352.
- Kochar, S., Mukerjee, H., Samaniego, F.J. (1999). The signature of a coherent system and its application to comparison among systems. Naval Res. Logist. 46:507–523.
- Navarro, J., Balakrishnan, N., Samaniego, F.J. (2008). Mixture representations of residual lifetimes of used systems. J. Appl. Probab. 45:1097–1112.
- Navarro, J., Ruiz, J.M., Sandoval, C.J. (2007). Properties of coherent systems with dependent components. Commun. Stat. Theory Methods 36:175–191.
- Samaniego, F.J. (1985). On closure of the IFR class under formation of coherent systems. IEEE Trans. Reliab. 34:69–72.
- Shaked, M., Shanthikumar, J.G. (2007). StochasticOrders. New York, NY: Springer.
- Tavangar, M. (2014). Some comparisons of residual life of coherent systems with exchangeable components. Naval Res. Logist. 61:549–556.
- Van Gemund, A.J.C., Reijns, G.L. (2012). Reliability analysis of k-out-or-n systems with single cold standby using Pearson distributions. IEEE Trans. Reliab. 61:526–532.
- Wu, Q., Wu, S. (2011). Reliability analysis of two-unit cold standby repairable systems under Poisson shocks. Appl. Math. Comput. 218:171–1820.