A Remark on the Non-Compactness of W2,d Immersions of d-Dimensional Hypersurfaces
Abstract
We consider the continuous W2,d immersions of d-dimensional hypersurfaces in Rd+1 with second fundamental forms uniformly bounded in Ld. Two results are obtained: first, a family of such immersions is constructed, whose limit fails to be an immersion of a manifold. This addresses the endpoint cases in J. Langer and P. Breuning. Second, under the additional assumption that the Gauss map is slowly oscillating, we prove that any family of such immersions subsequentially converges to a set locally parametrised by H\"older functions.
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