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Autori principali: Blitz, Samuel, Gover, A. Rod
Natura: Preprint
Pubblicazione: 2025
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Accesso online:https://arxiv.org/abs/2511.02072
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author Blitz, Samuel
Gover, A. Rod
author_facet Blitz, Samuel
Gover, A. Rod
contents Using variational considerations, we establish that there exists a new symmetric trace-free tensor conformal invariant of hypersurfaces embeddings in even dimensional conformal manifolds. This conformal invariant completes the family of conformal invariants known as conformal fundamental forms. The object has important links to global problems. In the context of the even dimensional boundary-value Poincaré--Einstein problem, the image of the Dirichlet--to--Neumann map is conformally invariant. Recent investigations established that this image is the pullback of a particular Riemannian invariant to the odd-dimensional boundary. We show here that, in fact, that image arises as the restriction of the new conformal invariant constructed here. As a consequence of the proof, we are able to construct several new global conformal invariants of the boundary. Finally, we use our variational results to establish that compact Bach-flat manifolds with umbilic boundary must admit a (formal to all orders) Poincaré--Einstein metric in the conformal class of its interior.
format Preprint
id arxiv_https___arxiv_org_abs_2511_02072
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Conformal hypersurface invariants and Bach-type Boundary Problems
Blitz, Samuel
Gover, A. Rod
Differential Geometry
Using variational considerations, we establish that there exists a new symmetric trace-free tensor conformal invariant of hypersurfaces embeddings in even dimensional conformal manifolds. This conformal invariant completes the family of conformal invariants known as conformal fundamental forms. The object has important links to global problems. In the context of the even dimensional boundary-value Poincaré--Einstein problem, the image of the Dirichlet--to--Neumann map is conformally invariant. Recent investigations established that this image is the pullback of a particular Riemannian invariant to the odd-dimensional boundary. We show here that, in fact, that image arises as the restriction of the new conformal invariant constructed here. As a consequence of the proof, we are able to construct several new global conformal invariants of the boundary. Finally, we use our variational results to establish that compact Bach-flat manifolds with umbilic boundary must admit a (formal to all orders) Poincaré--Einstein metric in the conformal class of its interior.
title Conformal hypersurface invariants and Bach-type Boundary Problems
topic Differential Geometry
url https://arxiv.org/abs/2511.02072