An Optimization Problem in Heat Conduction With Volume Constraint and Double Obstacles

Abstract

We consider the optimization problem of minimizing ∫Rn|∇ u|2\,dx with double obstacles φ≤ u≤ a.e. in D and a constraint on the volume of \u>0\D, where D⊂Rn is a bounded domain. By studying a penalization problem that achieves the constrained volume for small values of penalization parameter, we prove that every minimizer is C1,1 locally in D and Lipschitz continuous in Rn and that the free boundary ∂\u>0\D is smooth. Moreover, when the boundary of D has a plane portion, we show that the minimizer is C1,12 up to the plane portion.