An application of the isoperimetric inequality to the conformal scalar curvature equation

We construct global exotic solutions of the conformal scalar curvature equation u + [n(n -2)/4]Ku (n+2)/(n-2) = 0 in R n , with K(x) approaching 1 near infinity in order as close to the critical exponent as possible.  2001 Éditions scientifiques et médicales Elsevier SAS

In this paper we derive a local estimate of a positive singular solution u near its singular set Z of the conformal scalar curvature equation where K(x) is a positive continuous function, Z is a compact subset of Ω, and g satisfies that Assuming that the order of flatness at critical points of K o

Let Σ be the set of O(k) × O(m)-invariant functions on the unit sphere S n , k + m = n + 1, k m 2. We investigate the optimal value of the constant B in the inequality where u ∈ H q 1 (S n ) ∩ Σ and 1/p = 1/q -1/k. We then give an application to the existence of positive solutions to scalar curvatu