A capillarity one-phase Bernoulli free boundary problem

Abstract

We consider a one-phase Bernoulli free boundary problem in a container D - a smooth open subset of Rd - under the condition that on the fixed boundary ∂ D the normal derivative of the solutions is prescribed. We study the regularity of the free boundary (the boundary of the positivity set of the solution) up to ∂ D and the structure of the wetting region, which is the contact set between the free boundary and the ((d-1)-dimensional) fixed boundary ∂ D. In particular, we characterize the contact angle in terms of the permeability of the porous container and we show that the boundary of the wetting region is a smooth (d-2)-dimensional manifold, up to a (possibly empty) closed set of Hausdorff dimension at most d-5.

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