2023
Conformal Fundamental Forms and the Asymptotically Poincare-Einstein Condition
BLITZ, Samuel Harris, A Rod GOVER a Andrew WALDRONZákladní údaje
Originální název
Conformal Fundamental Forms and the Asymptotically Poincare-Einstein Condition
Autoři
BLITZ, Samuel Harris (840 Spojené státy, domácí), A Rod GOVER a Andrew WALDRON
Vydání
Indiana University Mathematics Journal, INDIANA UNIV MATH JOURNAL, 2023, 0022-2518
Další údaje
Jazyk
angličtina
Typ výsledku
Článek v odborném periodiku
Obor
10101 Pure mathematics
Stát vydavatele
Spojené státy
Utajení
není předmětem státního či obchodního tajemství
Odkazy
Impakt faktor
Impact factor: 1.100 v roce 2022
Kód RIV
RIV/00216224:14310/23:00133850
Organizační jednotka
Přírodovědecká fakulta
UT WoS
001166610900002
Klíčová slova anglicky
Extrinsic conformal geometry; hypersurface embeddings; Poincare-Einstein metrics; Yamabe problem
Štítky
Příznaky
Mezinárodní význam, Recenzováno
Změněno: 21. 3. 2024 10:29, Mgr. Marie Šípková, DiS.
Anotace
V originále
An important problem is to determine under which circumstances a metric on a conformally compact manifold is conformal to a Poincare-Einstein metric. Such conformal rescalings are in general obstructed by conformal invariants of the boundary hypersurface embedding, the first of which is the trace-free second fundamental form and then, at the next order, the trace-free Fialkow tensor. We show that these tensors are the lowest-order examples in a sequence of conformally invariant higher fundamental forms determined by the data of a conformal hypersurface embedding. We give a construction of these canonical extrinsic curvatures. Our main result is that the vanishing of these fundamental forms is a necessary and sufficient condition for a conformally compact metric to be conformally related to an asymptotically Poincare-Einstein metric. More generally, these higher fundamental forms are basic to the study of conformal hypersurface invariants. Because Einstein metrics necessarily have constant scalar curvature, our method employs asymptotic solutions of the singular Yamabe problem to select an asymptotically distinguished conformally compact metric. Our approach relies on conformal tractor calculus as this is key for an extension of the general theory of conformal hypersurface embeddings that we further develop here. In particular, we give in full detail tractor analogs of the classical Gauss Formula and Gauss Theorem for Riemannian hypersurface embeddings.