Your search keyword '"Dykhta, V."' showing total 2 results

1. Nonstandard duality and nonlocal necessary optimality conditions in nonconvex optimal control problems.

Author

Dykhta, V.

Subjects

*NONLINEAR systems, *CONTROL theory (Engineering), *PONTRYAGIN duality, *LAGRANGE equations, *SYSTEMS theory, *STABILITY of nonlinear systems

Abstract

To partially implement the idea of considering nonlinear optimal control problems immediately on the set of Pontryagin extremals (or on quasiextremals if the optimal solution does not exist), we introduce auxiliary functions of canonical variables, which we call bipositional, and the corresponding modified Lagrangian for the problem. The Lagrangian is subject to minimization on the trajectories of the canonical system from the Maximum Principle. This general approach is further specialized for nonconvex problems that are linear in state, leading to a nonstandard dual optimal control problem on the trajectories of the adjoint system. Applying the feedback minimum principle to both original and dual problems, we have obtained a pair of necessary optimality conditions that significantly strengthen the Maximum Principle and admit a constructive realization in the form of an iterative problem solving procedure. The general approach, optimality features, and the iterative solution procedure are illustrated by a series of examples. [ABSTRACT FROM AUTHOR]

Published

2014

2. Hamilton-Jacobi inequalities and the optimality conditions in the problems of control with common end constraints.

Author

Dykhta, V. and Sorokin, S.

Subjects

*HAMILTON-Jacobi equations, *LYAPUNOV functions, *QUADRATIC equations, *PONTRYAGIN duality, *LAGRANGE equations

Abstract

The canonical theory of the necessary and sufficient conditions for global optimality based on the sets of nonsmooth solutions of the differential Hamilton-Jacobi inequalities of two classes of weakly and strongly monotone Lyapunov type functions was developed. These functions enable one to estimate from above and below the objective functional of the optimal control problem and determine the internal and external approximations of the reachability set of the controlled dynamic system. [ABSTRACT FROM AUTHOR]

Published

2011