Abstract
A class of stochastic control problems where the payoff depends on the running maximum of a diffusion process is described. The controller must make two kinds of decision: first, he must choose a work rate (this decision determines the rate of profit as well as the proximity of failure), and second, he must decide when to replace a deteriorated system with a new one. Preventive replacement is a realistic option if the cost for replacement after failure is larger than the cost of a preventive replacement.
We focus on the revenue and replacement cost for a single work cycle and solve the problem in two stages. First, the optimal feedback control (work rate) is determined by maximizing the payoff during a single excursion of a controlled diffusion away from the running maximum. This step involves the solution of the Hamilton-Jacobi-Bellman partial differential equation. The second step is to determine the optimal replacement set. The assumption that failure occurs only when the state is increasing restricts the optimal replacement set. This leads to a simple formula for the optimal replacement level in terms of the value function.
The authors’ research was supported by the National Science Foundation grant DMS-9006674.
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© 1992 Springer-Verlag
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Heinricher, A.C., Stockbridge, R.H. (1992). Optimal control and replacement with state-dependent failure rate. In: Duncan, T.E., Pasik-Duncan, B. (eds) Stochastic Theory and Adaptive Control. Lecture Notes in Control and Information Sciences, vol 184. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0113244
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DOI: https://doi.org/10.1007/BFb0113244
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