Study of a perturbed boundary optimal control system

In this paper, we are concerned with finding optimal controls for a class of linear boundary optimal control systems associated to a Laplace operator on a regular bounded domain in the n-dimensional Euclidean space. For these systems, in previous works (see [1,2]), we proved existence of the (pertur

A method is proposed to solve fixed end-point, linear optimal control problems with quadratic cost and singularly perturbed state. After translating the problem into a two-point boundary value problem, we choose two points t1, t2 E [ t o , tf] and let 7 = ( t -~o ) / E and u = ( t ft)/e. The ~s c a

In this paper, we consider a nonlinear elliptic control system with distributed and boundary controls and with the integral cost functional. Some sufficient conditions under which the solutions of the elliptic systems continuously depend on boundary and distributed controls are presented. The proof

## Abstract In this paper, the linear quadratic optimal stochastic control problem is investigated for multiparameter singularly perturbed stochastic systems in which __N__ lower‐level fast subsystems are interconnected by a higher‐level slow subsystem. After establishing the asymptotic structure o

A correlation has been proposed for the transport of gases through insoluble monolayers in the form of Equation (1). This equation is applicable to an area coverage below 32A.2/molecule of the monolayer and when interactions among molecules of water, gas, and monolayer may be neglected. Therefore, i