Existence and structure of solutions for general P-area minimizing surface

Abstract

We study existence and structure of solutions to the Dirichlet and Neumann boundary problems associated with minimizers of the functional I(u)=∫ (φ(x, D u + F)+Hu) \, dx, where φ (x, ), among other properties, is convex and homogeneous of degree 1 with respect to . We show that there exists an underlying vector field N that characterizes the existence and structure of all minimizers. We also investigate existence of solutions under the barrier condition on ∂ . The results in this paper generalize and unify many results in the literature about existence of minimizers of least gradient problems and P-area minimizing surfaces.

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