Abstract
In this paper, we study a general maintenance model. Assume that at the beginning, a secondhand (outdated) system is installed, thereafter it will be replaced by a new (updated) system. Two types of compound maintenance policy are used. A policy ( t, T) is to replace the secondhand (outdated) system at time t and replace a new (updated) system at time T; whereas a policy ( n, N) is to replace the secondhand (outdated) system at the time of nth failure and replace a new (updated) system at the time of Nth failure. We show that an optimal policy ( n ∗,N ∗ ) is at least as good as an optimal policy ( t ∗,T ∗ ). Furthermore, for a monotone process model, by the semi-Markov decision process approach, an optimal policy ( n ∗,N ∗ ) is determined explicitly for maximizing the total expected discounted reward.
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