Kirk E. Lancaster scite author profile

ABSTRACT. Let 0 be an open set in R2 which is locally convex at each point of its boundary except one, say (0,0). Under certain mild assumptions, the solution of a prescribed mean curvature equation on Q behaves as follows: All radial limits of the solution from directions in 12 exist at (0,0), these limits are not identical, and the limits from a certain half-space (H) are identical. In particular, the restriction of the solution to Q n H is the solution of an appropriate Dirichlet problem. Introduction.We consider here the behavior of a generalized solution of the equation for surfaces of prescribed mean curvature at an inner corner of the boundary where the solution is discontinuous. This work is a generalization of the previous work of the second author [8], which dealt with the minimal surface equation. It was shown there that all radial limits exist and that they are constant in directions coming from a half-space. Here we find that the same result holds for (nonparametric) surfaces of prescribed mean curvature.

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Kirk E. Lancaster

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