论文信息 - Nearest feasible paths in optimal control problems: Theory, examples, and counterexamples

Nearest feasible paths in optimal control problems: Theory, examples, and counterexamples

Many infinite-horizon optimal control problems in management science and economics have optimal paths that approach some stationary level. Often, this path has the property of being the nearest feasible path to the stationary equilibrium. This paper obtains a simple multiplicative characterization for a single-state single-control problem to have this property. By using Green's theorem it is shown that the property is observed as long as the stationary level is sustainable by a feasible control. If not, the property is, in general, shown to be false. The paper concludes with an important theorem which states that even in the case of multiple equilibria, the optimal path is a nearest feasible path to one of them.

Suresh P. Sethi | S. Sethi

[1] M. L. Vidale,et al. An Operations-Research Study of Sales Response to Advertising , 1957 .

[2] Angelo Miele,et al. Extremization of Linear Integrals by Green's Theorem , 1962 .

[3] Sanders Jl,et al. Quantitative guidelines for communicable disease control programs. , 1971 .

[4] Suresh P. Sethi,et al. Optimal Control of the Vidale-Wolfe Advertising Model , 1973, Operational Research.

[5] S. Sethi,et al. Quantitative guidelines for communicable disease control program: a complete synthesis. , 1974, Biometrics.

[6] A. Spence,et al. Most Rapid Approach Paths in Accumulation Problems , 1975 .

[7] Optimal investment policy: An application of Stokes' theorem , 1976 .

[8] Suresh P. Sethi,et al. Optimal Quarantine Programmes for Controlling an Epidemic Spread , 1978 .

[9] Suresh Sethi. Optimal Equity and Financing Model of Krouse and Lee: Corrections and Extensions , 1978 .

[10] Suresh Sethi,et al. A Survey of Management Science Applications of the Deterministic Maximum Principle , 1978 .

[11] Suresh P. Sethi,et al. Optimal advertising policy with the contagion model , 1979 .