Unstable free boundary problems in optimal control theory: existence and regularity

Abstract

We establish the first general regularity result for constrained optimal control problems arising naturally in mathematical physics and mathematical biology. Namely, we prove that for a large class of problems of the form ``maximise ∫ (m)-c∫ m where - m=mm+B(x,m), under the constraint 0≤ m≤ 1 a.e.", the solution m* is bang-bang, in the sense that m*=E*, and that ∂ E* is smooth up to a (d-2)-dimensional subset. Moreover, we prove that the solutions to the volume constrained problem ``maximise ∫ (m) where - m=mm+B(x,m), under the constraint 0≤ m≤ 1 a.e and ∫ m=m0" are bang-bang in the sense that m*=E* and that, in the two-dimensional case, ∂ E* is a finite union of smooth curves. This is done via reduction to an unstable free boundary problem, the regularity analysis of which was pioneered by Monneau \& Weiss and Chanillo, Kenig \& To. In our case, the free boundary is not minimising, and the laplacian of the state function is sign-changing, which creates significant difficulties, in particular regarding the non-degeneracy of blow-ups. This requires a new approach blending tools from optimal control theory, free boundary and measure theory to establish the regularity of the free boundary.