Existence and compactness of conformal metrics on the plane with unbounded and sign-changing Gaussian curvature
Abstract
We show that the prescribed Gaussian curvature equation in R2 - u= (1-|x|p) e2u, has solutions with prescribed total curvature equal to :=∫R2(1-|x|p)e2udx∈ R, if and only if p∈(0,2) and (2+p)π<4π and prove that such solutions remain compact as ∈[(2+p)π,4π), while they produce a spherical blow-up as 4π.
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