A transmission problem for (p,q)-Laplacian

Abstract

In this paper, we consider a double-phase problem characterised by a transmission that takes place across the zero level "surface" of the minimiser of the functional J(v,) = ∫ ( |D v+|p + |D v-|q ) dx. We prove that a minimiser exists, and is H\"older continuous, whence using an intrinsic variation we prove a weak formulation of the free boundary condition across the zero level surface, formally represented by (q-1)|D u-|q = (p-1) |D u+|p, on ∂ \u > 0\. We show that the free boundary is C1,α a.e. with respect to the measure p u+, whose support is of σ-finite (n-1)-dimensional Hausdorff measure.

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