On elliptic equations involving surface measures
Abstract
We show optimal Lipschitz regularity for very weak solutions of the (measure-valued) elliptic PDE -div(A(x) ∇ u) = Q \; Hn-1 in a smooth domain ⊂ Rn. Here is a C1,α-regular hypersurface, Q∈ C0,α is a density on , and the coefficient matrix A is symmetric, uniformly elliptic and W1,q-regular (q > n). We also discuss optimality of these assumptions on the data. The equation can be understood as a special coupling of two A-harmonic functions with an interface . As such it plays an important role in several free boundary problems, as we shall discuss.
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