A note on the critical Laplace Equation and Ricci curvature
Abstract
We study strictly positive solutions to the critical Laplace equation \[ - u = n(n-2) un+2n-2, \] decaying at most like d(o, x)-(n-2)/2, on complete noncompact manifolds (M, g) with nonnegative Ricci curvature, of dimension n ≥ 3. We prove that, under an additional mild assumption on the volume growth, such a solution does not exist, unless (M, g) is isometric to Rn and u is a Talenti function. The method employs an elementary analysis of a suitable function defined along the level sets of u.
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