Regularity for critical points of convex functionals on Hessian spaces
Abstract
We consider variational integrals of the form ∫ F(D2u) where F is convex and smooth on the Hessian space. We show that a critical point u∈ W2,∞ of such a functional under compactly supported variations is smooth if the Hessian of u has a small oscillation.
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