Quasi-Invariant Optimal Control Problems

Quasi-Invariant Optimal Control Problems

Finite Element Methods for Optimal Control Problems Governed by Linear Quasi-parabolic Integro-differential Equations

Linear quasi-parabolic integro-differential equations and their control appear in many scientific problems and engineering applications such as biology mechanics, nuclear reaction dynamics, heat conduction in materials with memory, and visco-elasticity, etc.. The existence and uniqueness of the solution of the linear quasi-parabolic integro-differential equations have been studied by Wheeler M....

An optimal control problem governed by implicit evolution quasi-variational inequalities

This paper deals with an optimal control problem associated to an evolution implicit quasi-variational inequality for elastic materials. Such problems describe the quasi-static process of bilateral contact with friction between an elastic body and a rigid foundation. Existence of an optimal control is proven and necessary optimality conditions are derived.

A quasi-separation theorem for LQG optimal control with IQ constraints

We consider the deterministic, the full observation and the partial observation LQG optimal control problems with nitely many IQ (integral quadratic!) constraints, and show that Wohnam's famous Separation Theorem for stochastic control has a generalization to this case. Although the problems of ltering and control are not independent, we show that the interdependence of these two problems is so...

On the relationship between logarithmic sensitivity integrals and limiting optimal control problems

Two seemingly independent streams of control systems research have examined logarithmic sensitivity integrals and limiting linear quadratic optimal control problems. These apparently diverse problems yield some results with an identical right hand side. The main contribution of this paper is to directly explain the commonality between these streams. This explanation involves the use of Parseval...