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Directional regularity and metric regularity metric regularity which is stable subject to small Lipschitzian perturbations of the constraint mapping
МОДЕЛИРОВАНИЕ ПРОЦЕССОВ УПРАВЛЕНИЯ, УСТОЙЧИВОСТЬ И СТАБИЛИЗАЦИЯ are defined, and the algorithm of the constraints perturbations equations construction, guaranteeing
О связи диссипативной функции и стабилизации связей при решении обратной задачи динамики between equations of perturbed constraints and dissipative function is investigated.
ON CONSTRUCTING DYNAMICAL EQUATIONS. The equations of constraint perturbations are determined and the conditions of asymptotic stability
Sensitivity analysis for abnormal optimization problems with a cone constraint optimization problems depending on parameters. par The feasible set is defined by means of a constraint mapping
Properties of the minimum function in the quadratic problemPerturbations of the quadratic form minimization problem under quadratic constraints of the type
Principle of maximum for differential inclusions with phase constraints inclusion dot xin F(x,t) under the constraints K^1(p)leq 0, K^2(p)=0, x(t)in G(t) with the cost function k^0
Optimal control of a nonconvex perturbed sweeping process nonconvex moving sets and additive perturbations. This is a new class of optimal control problems
Matrix-represented constraints satisfaction methods: practical aspects of their implementation of qualitative constraints of
a subject domain in the framework of constraint programming
technology
The maximum principle in optimal control problems with phase constraints. Nondegeneracy and stability hypothesis. The last theorem contains a stability property of the multipliers with respect to perturbations F
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