Local Conformal Rigidity in Codimension $\leq$ 5
Differential Geometry
2013-12-24 v1
Abstract
In this paper, for an immersion of an -dimensional Riemannian manifold into -Euclidean space we give a sufficient condition on so that, in case , any immersion of into -Euclidean space that induces on a metric that is conformal to the metric induced by is locally obtained, in a dense subset of , by a composition of and a conformal immersion from an open subset of -Euclidean space into an open subset of -Euclidean space. Our result extends a theorem for hypersurfaces due to M. Dajczer and E. Vergasta. The restriction on the codimension is related to a basic lemma in the theory of rigidity obtained by M. do Carmo and M. Dajczer.
Cite
@article{arxiv.1312.6292,
title = {Local Conformal Rigidity in Codimension $\leq$ 5},
author = {Sérgio Luiz Silva},
journal= {arXiv preprint arXiv:1312.6292},
year = {2013}
}
Comments
16 pages