On functions with given boundary data and convex constraints on the gradient
Abstract
Let ⊂Rd be an open set. Given a boundary datum g on ∂ and a function K: , the family of all compact convex subsets of Rd, we prove the existence of functions u: such that u=g on ∂ and ∇ u(x)∈ K(x) a.e. and we investigate the regularity of such solutions on the set U ⊂ of points at which they all coincide.
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