Euclidean Hypersurfaces with Genuine Conformal Deformations in Codimension Two
Abstract
In this paper we classify Euclidean hypersurfaces f Mn → Rn+1 with a principal curvature of multiplicity n-2 that admit a genuine conformal deformation f Mn → Rn+2. That f Mn → Rn+2 is a genuine conformal deformation of f means that it is a conformal immersion for which there exists no open subset U ⊂ Mn such that the restriction f|U is a composition f|U=h f|U of f|U with a conformal immersion h V Rn+2 of an open subset V⊂ Rn+1 containing f(U).
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