Toward best isoperimetric constants for (H1,BMO)-normal conformal metrics on ,R n3

Autores: Jie Xiao
Localización: Advances in mathematics, ISSN 0001-8708, Vol. 220, Nº 2, 2009, págs. 540-559
Idioma: inglés
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Resumen
- The aim of this article is: (a) to establish the existence of the best isoperimetric constants for the (H1,BMO)-normal conformal metrics e2u|dx|2 on , n3, i.e., the conformal metrics with the Q-curvature orientated conditions (b) to prove that is the optimal upper bound of the best isoperimetric constants for the complete (H1,BMO)-normal conformal metrics with nonnegative scalar curvature; (c) to find the optimal upper bound of the best isoperimetric constants via the quotients of two power integrals of Green's functions for the n-Laplacian operators -div(|u|n-2u).