Optimization Techniques 1973: 5th Conference on Optimization Techniques Part I pp 319-328 | Cite as
Sufficient conditions of optimality for contingent equations
Optimal Control
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Keywords
Maximum Principle Support Function Differential Inclusion Adjoint System Contingent Equation
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References
- 1.Blagodatskih, V.I., On local controllability of differential inclution (Russian), Differenc. Uravn. 9, No. 2, (1973) 361–362.Google Scholar
- 2.Filippov, A.F., Classical solutions of differential equations with multivalued right-hand sides (English trans.), SIAM Control, 5 (1967), 609–621.CrossRefGoogle Scholar
- 3.Hermes, H., The generalized differential equation x ∈ R(t, x), Adv. in Math., 4, No. 2, (1970) 149–169.CrossRefGoogle Scholar
- 4.Ponstein, J., Seven kinds of convexity, SIAM Review, 9, No. 1, (1967) 115–119.CrossRefGoogle Scholar
- 5.Blagodatskih, V.I., Sufficient condition of optimality (Russian), Differens. Uravn., 9, No. 3, (1973), 416–422.Google Scholar
- 6.Boltyamskii, V.G., Linear problem of optimal control (Russian), Differenc. Uravn., 5, No. 3, (1969) 783–799.Google Scholar
- 7.Dajovich, S., On optimal control theory in linear systems (Russian), Differenc. Uravn., 8, No. 9, (1972) 1687–1690.Google Scholar
- 8.Boltyanskii, V.G., Mathematical methods of optimal control, Moscow, (1969).Google Scholar
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© Springer-Verlag Berlin Heidelberg 1973