The sphere covering inequality and its applications
成果类型:
Article
署名作者:
Gui, Changfeng; Moradifam, Amir
署名单位:
Hunan University; University of Texas System; University of Texas at San Antonio; University of California System; University of California Riverside
刊物名称:
INVENTIONES MATHEMATICAE
ISSN/ISSBN:
0020-9910
DOI:
10.1007/s00222-018-0820-2
发表日期:
2018
页码:
1169-1204
关键词:
mean-field equations
2-dimensional euler equations
aubin-onofri inequality
statistical-mechanics
asymptotic-behavior
gaussian curvature
stationary flows
symmetry
sobolev
摘要:
In this paper, we showthat the total area of two distinct surfaces with Gaussian curvature equal to 1, which are also conformal to the Euclidean unit disk with the same conformal factor on the boundary, must be at least 4p. In otherwords, the areas of these surfaces must cover the whole unit sphere after a proper rearrangement. We refer to this lower bound of total area as the Sphere Covering Inequality. The inequality and its generalizations are applied to a number of open problems related to Moser-Trudinger type inequalities, mean field equations and Onsager vortices, etc, and yield optimal results. In particular, we prove a conjecture proposed by Chang and Yang (Acta Math 159(34): 215-259, 1987) in the study of Nirenberg problem in conformal geometry.