On the Sobolev quotient of three-dimensional CR manifolds

被引：4

作者：

Cheng, Jih-Hsin ^{[1
,2
]}

Malchiodi, Andrea ^{[3
]}

Yang, Paul ^{[4
]}

机构：

[1] Acad Sinica, Inst Math, 6F,Astron Math Bldg 1,Sec 4,Roosevelt Rd, Taipei 10617, Taiwan

[2] NCTS, 6F,Astron Math Bldg 1,Sec 4,Roosevelt Rd, Taipei 10617, Taiwan

[3] Scuola Normale Super Pisa, Piazza Cavalieri 7, I-50126 Pisa, Italy

[4] Princeton Univ, Dept Math, Fine Hall,Washington Rd, Princeton, NJ 08544 USA

来源：

REVISTA MATEMATICA IBEROAMERICANA | 2023年 / 39卷 / 06期

关键词：

CR manifold; Rossi sphere; pseudo-hermitian mass; CR-Sobolev quotient; PANEITZ OPERATOR; YAMABE PROBLEM; CONJECTURE; PROOF;

D O I：

10.4171/RMI/1412

中图分类号：

O1 [数学];

学科分类号：

0701 ; 070101 ;

摘要：

We exhibit examples of compact three-dimensional CR manifolds of pos-itive Webster class, Rossi spheres, for which the pseudo-hermitian mass, as defined by Cheng-Malchiodi-Yang (2017), is negative, and for which the infimum of the CR-Sobolev quotient is not attained. To our knowledge, this is the first geometric context on smooth closed manifolds where this phenomenon arises, in striking con-trast to the Riemannian case.

引用

页码：2017 / 2066

页数：50

共 50 条

[1] A characterization of homogeneous three-dimensional CR manifolds
Cheng, Jih-Hsin
Malchiodi, Andrea
Yang, Paul
REVISTA MATEMATICA IBEROAMERICANA, 2024, 40 (06) : 2325 - 2338
[2] Deformations and embeddings of three-dimensional strictly pseudoconvex CR manifolds
Sean N. Curry
Peter Ebenfelt
Mathematische Annalen, 2024, 389 : 627 - 669
[3] Erratum to: A global invariant for three-dimensional CR-manifolds
D.M. Burns, Jr
C.L. Epstein
Inventiones mathematicae, 2000, 139 (2) : 457 - 457
[4] Deformations and embeddings of three-dimensional strictly pseudoconvex CR manifolds
Curry, Sean N.
Ebenfelt, Peter
MATHEMATISCHE ANNALEN, 2024, 389 (01) : 627 - 669
[5] STRUCTURES OF GEOMETRIC QUOTIENT ORBIFOLDS OF THREE-DIMENSIONAL G-MANIFOLDS OF GENUS TWO
Kim, Jungsoo
JOURNAL OF THE KOREAN MATHEMATICAL SOCIETY, 2009, 46 (04) : 859 - 893
[6] Invariants of three-dimensional manifolds
Gelfand, S
Kazhdan, D
GEOMETRIC AND FUNCTIONAL ANALYSIS, 1996, 6 (02) : 268 - 300
[7] Localization on three-dimensional manifolds
Willett, Brian
JOURNAL OF PHYSICS A-MATHEMATICAL AND THEORETICAL, 2017, 50 (44)
[8] Tabulation of three-dimensional manifolds
Matveev, SV
RUSSIAN MATHEMATICAL SURVEYS, 2005, 60 (04) : 673 - 698
[9] Three-dimensional Anosov flag manifolds
Barbot, Thierry
GEOMETRY & TOPOLOGY, 2010, 14 (01) : 153 - 191
[10] BOUNDARY SLOPES IN THREE-DIMENSIONAL MANIFOLDS
Sbrodova, E. A.
TRUDY INSTITUTA MATEMATIKI I MEKHANIKI URO RAN, 2007, 13 (04): : 119 - 128

← 1 2 3 4 5 →