Keywords
Operating System Artificial Intelligence System Theory
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Literature Cited
- 1.E. A. Nurminskii, “On the properties of a certain class of functions,” in: Optimal Decision Theory [in Russian], Kiev (1972).Google Scholar
- 2.R. Mifflin, “Semismooth and semiconvex functions in constrained optimization,” SIAM J. Control Optim.,15, No. 6 (1976).Google Scholar
- 3.B. N. Pshenichnyi, TheNecessary Conditions for an Extremum [in Russian], Nauka, Moscow (1969).Google Scholar
- 4.N. Z. Shor, “On a class of almost differentiable functions and a certain method of minimization functions of this class,” Kibernetika (1972).Google Scholar
- 5.F. H. Clark, “Generalized gradients and applications,” Trans. Am. Math. Soc.,205 (1975).Google Scholar
- 6.L. A. Rastrigin, Extremal Control Systems [in Russian], Nauka, Moscow (1974).Google Scholar
- 7.N. Z. Shor, L. A. Galustova, S. P. Strutinskaya, and A. I. Momot, “Optimal flow distribution in the unified gas mains,” in: Application of Mathematical Methods in Economical Research and Planning [in Russian], Inst. Kibern. Akad. Nauk UkrSSR, Kiev (1972).Google Scholar
- 8.N. Z. Shor, L. A. Galustova, and A. I. Momot, “Application of mathematical methods in optimal design of the unified gas mains with allowance for its evolution dynamics,” Kibernetika, No. 1 (1978).Google Scholar
- 9.Yu. B. Germeier, Nonantagonistic Games [in Russian], Nauka, Moscow (1976).Google Scholar
- 10.V. I. Norkin, “Nonlocal minimization algorithms for nondifferentiable functions,” Kibernetika, No. 5 (1978).Google Scholar
- 11.G. Leburg, “Valeur moyenne pour gradient generalisé,” C. R. Acad. Sci. Paris,281 (1975).Google Scholar
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