Mathematical foundations of minimal cutsets

Since their introduction in the reliability field, binary decision diagrams have proved to be the most efficient tool to assess Boolean models such as fault trees. Their success increases the need of sound mathematical foundations for the notions that are involved in reliability and dependability studies. This paper clarifies the mathematical status of the notion of minimal cutsets which have a central role in fault-tree assessment. Algorithmic issues are discussed. Minimal cutsets are distinct from prime implicants and they have a great interest from both a computation complexity and practical viewpoint. Implementation of BDD algorithms is explained. All of these algorithms are implemented in the Aralia software, which is widely used. These algorithms and their mathematical foundations were designed to assess efficiently a very large noncoherent fault tree that models the emergency shutdown system of a nuclear reactor