Weak immersions with second fundamental form in a critical Sobolev space
Abstract
We develop the analysis of Lipschitz immersions of n-dimensional manifolds into Rd having their second fundamental forms bounded in the critical Sobolev space Wn2-1,2 in dimension n≥ 4 even and any codimension. We prove that, while such a weak immersion is not necessary C1, it generates a C1 differential structure on the domain. More precisely, for any such an immersion, there is an atlas in which the first fundamental form is continuous and the transition maps are C1. We prove that this C1 structure is diffeomorphic to the original one. This result is the starting point of the analysis of the behavior of sequences of weak immersions with second fundamental forms uniformly bounded in the critical Sobolev space Wn2-1,2. In the second part of the paper we establish a weakly sequential closure theorem for such sequences. This analysis is motivated by the study of conformally invariant Lagrangian of immersions in dimension larger than two such as generalized Willmore energies, for instance the Graham--Reichert functional obtained in the computation of renormalized volumes of five-dimensional minimal submanifolds of the hyperbolic space Hd+1.
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