On the Convergence of the Approximate Solution to the Optimization Problem for Oscillatory Processes
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Karagandy University of the name of academician E.A. Buketov
Abstract
This article addresses the non-linear optimization problem of oscillatory processes governed by partial
integro-differential equations involving a Fredholm integral operator. A distinctive feature of the problem
is that both the objective functional and the functions describing external and boundary influences are
non-linear with respect to the vector controls. The integro-differential equation describing the state of the
oscillatory process includes Fredholm integral operator, which has a significant impact on the structure and
properties of the solutions. The algorithm for constructing the complete solution to this problem, as well as
the effect of the Fredholm integral operator on the solution of the corresponding boundary value problem,
has been published in previous studies. This article is dedicated to the investigation of the convergence
of approximate solutions to the exact solution of the considered non-linear optimization problem. The
influence of the Fredholm integral operator on the convergence behavior of the approximations is examined.
It is demonstrated that the presence of the integral operator necessitates the construction of three distinct
types of approximations of the optimal process: “Resolvent” approximations, based on the resolvent of the
kernel of the integral operator; Approximations by optimal controls, constructed through the approximation
of control functions; Finite-dimensional approximations.
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On the Convergence of the Approximate Solution to the Optimization Problem for Oscillatory Processes / Abdyldaeva E.F. [et al.] // Bulletin of the Karaganda University. Mathematics Series. – 2025. – № 3(119). – pp. 22-33.