Computing minimal signature of coherent systems through matrix-geometric distributions

Abstract: Signatures are useful in analyzing and evaluating coherent systems. However, their computation is a challenging problem, especially for complex coherent structures. In most cases the reliability of a binary coherent system can be linked to a tail probability associated with a properly defined waiting time random variable in a sequence of binary trials. In this paper we present a method for computing the minimal signature of a binary coherent system. Our method is based on matrix-geometric distributions. First,… Show more

Computing waiting time probabilities related to $$ (k_{1},k_{2},\ldots ,k_{l})$$ pattern

Computing waiting time probabilities related to $$ (k_{1},k_{2},\ldots ,k_{l})$$ pattern