An optimization problem with volume constrain in Orlicz spaces

Abstract

We consider the optimization problem of minimizing ∫G(|∇ u|) dx in the class of functions W1,G(), with a constrain on the volume of \u>0\. The conditions on the function G allow for a different behavior at 0 and at ∞. We consider a penalization problem, and we prove that for small values of the penalization parameter, the constrained volume is attained. In this way we prove that every solution u is locally Lipschitz continuous and that the free boundary, ∂\u>0\ , is smooth.