Monomial ideals and the Scarf complex for coherent systems in reliability theory
Abstract
A certain type of integer grid, called here an echelon grid, is an object found both in coherent systems whose components have a finite or countable number of levels and in algebraic geometry. If α=(α1,...,αd) is an integer vector representing the state of a system, then the corresponding algebraic object is a monomial x1α1... xdαd in the indeterminates x1,..., xd. The idea is to relate a coherent system to monomial ideals, so that the so-called Scarf complex of the monomial ideal yields an inclusion-exclusion identity for the probability of failure, which uses many fewer terms than the classical identity. Moreover in the ``general position'' case we obtain via the Scarf complex the tube bounds given by Naiman and Wynn [J. Inequal. Pure Appl. Math. (2001) 2 1-16]. Examples are given for the binary case but the full utility is for general multistate coherent systems and a comprehensive example is given.
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