A compactness theorem for scalar-flat metrics on manifolds with boundary

A. Ambrosetti; B. Hu; C.-C. Chen; E. Hebey; F. Marques; F. Marques; F. Marques; G. Giraud; H. Yamabe; J. Escobar; J. Escobar; J. Escobar; J. Escobar; J. Lee; L. Nirenberg; M. Berti; M. Chipot; M. Khuri; N. Trudinger; O. Druet; O. Druet; P. Cherrier; R. Schoen; R. Schoen; S. Brendle; S. Brendle; S. Brendle; Sérgio de Moura Almaraz; T. Aubin; T. Aubin; V. Felli; V. Felli; Y. Li; Y. Li; Y. Li; Y. Li; Z. Djadli; Z. Djadli; Z. Han

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A compactness theorem for scalar-flat metrics on manifolds with boundary

Authors: A. Ambrosetti
B. Hu
C.-C. Chen
E. Hebey
F. Marques
F. Marques
F. Marques
G. Giraud
H. Yamabe
J. Escobar
J. Escobar
J. Escobar
J. Escobar
J. Lee
L. Nirenberg
M. Berti
M. Chipot
M. Khuri
N. Trudinger
O. Druet
O. Druet
P. Cherrier
R. Schoen
R. Schoen
S. Brendle
S. Brendle
S. Brendle
Sérgio de Moura Almaraz
T. Aubin
T. Aubin
V. Felli
V. Felli
Y. Li
Y. Li
Y. Li
Y. Li
Z. Djadli
Z. Djadli
Z. Han
Publication date: 1 January 2009
Publisher: 'Springer Science and Business Media LLC'
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Abstract

Let (M,g) be a compact Riemannian manifold with boundary. This paper is concerned with the set of scalar-flat metrics which are in the conformal class of g and have the boundary as a constant mean curvature hypersurface. We prove that this set is compact for dimensions greater than or equal to 7 under the generic condition that the trace-free 2nd fundamental form of the boundary is nonzero everywhere.Comment: 49 pages. Final version, to appear in Calc. Var. Partial Differential Equation

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