An optimization problem with volume constraint with applications to optimal mass transport

Abstract

In this manuscript we study the following optimization problem with volume constraint: \[ \1p∫ |∇ v|pdx- ∫∂ gv\,dS v ∈ W1, p (), and |\v>0\| ≤ α\. \] Here g is acontinuous function and α is a fixed constant such that 0< α< ||. Under the assumption that ∫∂ g(x)dS >0 we prove that a minimizer exists and satisfies \ arrayccl -p up = 0 &in &\up>0\ \up<0\, \\[5pt] |∇ up|p-2∂ up∂ = g & on &∂ ∂(\up>0\ \up<0\ ) ,\\[5pt] |\up>0\| = α. & & array . Next, we analyze the limit as p ∞. We obtain that any sequence of weak solutions converges, up to a subsequence, pj ∞ upj(x)=u∞(x), uniformly in , and uniform limits, u∞, are solutions to the maximization problem with volume constraint \ ∫∂ gv\,dS v ∈ W1, ∞ (), \|∇ v\|L∞()≤ 1 and |\v>0\| ≤ α\. Furthermore, we obtain the limit equation that is verified by u∞ in the viscosity sense. Finally, it turns out that such a limit variational problem is connected to the Monge-Kantorovich mass transfer problem with the involved measures are supported on ∂ and along the limiting free boundary, ∂ \u∞ ≠ 0\.