An obstruction to small time local null controllability for a viscous Burgers' equation

Abstract

In this work, we are interested in the small time local null controllability for the viscous Burgers' equation yt - yxx + y yx = u(t) on the line segment [0,1], with null boundary conditions. The second-hand side is a scalar control playing a role similar to that of a pressure. In this setting, the classical Lie bracket necessary condition [f1,[f1,f0]] introduced by Sussmann fails to conclude. However, using a quadratic expansion of our system, we exhibit a second order obstruction to small time local null controllability. This obstruction holds although the information propagation speed is infinite for the Burgers equation. Our obstruction involves the weak H-5/4 norm of the control u. The proof requires the careful derivation of an integral kernel operator and the estimation of residues by means of weakly singular integral operator estimates.