On a Constrained Approximate Controllability Problem for the Heat Equation

In this work, we study an approximate control problem for the heat equation, with a nonstandard but rather natural restriction on the solution. It is well known that approximate controllability holds. On the other hand, the total mass of the solutions of the uncontrolled system is constant in time. Therefore, it is natural to analyze whether approximate controllability holds supposing the total mass of the solution to be a given constant along the trajectory. Under this additional restriction, approximate controllability is not always true. For instance, this property fails when Ω is a ball. We prove that the system is generically controllable; that is, given an open regular bounded domain Ω, there exists an arbitrarily small smooth deformation u, such that the system is approximately controllable in the new domain ΩCu under this constraint. We reduce our control problem to a nonstandard uniqueness problem. This uniqueness property is shown to hold generically with respect to the domain.