Approximate Controllability Problems for the Heat Equation in a Half-Plane Controlled by the Dirichlet Boundary Condition with a Bounded Control

Abstract

In the paper, the problems of approximate controllability are studied for the control system wt= w, w(0,x2,t)=u(x2,t), x1∈ R+=(0,+∞), x2∈ R, t∈(0,T), where u is a control belonging to a special subset of L∞( R× (0,T)) L2( R× (0,T)). It is proved that each initial state belonging to L2( R+× R) is approximately controllable to an arbitrary end state belonging to L2( R+× R) by applying these controls. A numerical algorithm of solving the approximate controllability problem for this system is given. The results are illustrated by an example.