Local C1,β-regularity at the boundary of two dimensional sliding almost minimal sets in R3
Abstract
In this paper, we will give a C1,β-regularity result on the boundary for two dimensional sliding almost minimal sets in R3. This effect may lead to the existence of a solution to the Plateau problem with sliding boundary conditions proposed by Guy David in David:2014p in the case that the boundary is a 2-dimensional smooth manifold.
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