Small-time global null controllability of generalized Burgers' equations

Abstract

In this paper, we study the small-time global null controllability of the generalized Burgers' equations yt + γ |y|γ-1yx-yxx=u(t) on the segment [0,1]. The scalar control u(t) is uniform in space and plays a role similar to the pressure in higher dimension. We set a right Dirichlet boundary condition y(t,1)=0, and allow a left boundary control y(t,0)=v(t). Under the assumption γ>3/2 we prove that the system is small-time global null controllable. Our proof relies on the return method and a careful analysis of the shape and dissipation of a boundary layer.