Normal conformal metrics with prescribed Q-Curvature in R2n
Abstract
We consider the Q-curvature equation equation0.1 (-)n u = K(x)e2nu ~R2n \ (n ≥ 2) equation where K is a given non constant continuous function. Under mild growth control on K, we get a necessary condition on the total curvature u for any normal conformal metric gu = e2u|dx|2 satisfying Qgu = K in R2n, or equivalently, solutions to equation with logarithmic growth at infinity. Inversely, when K is nonpositive satisfying polynomial growth control, we show the existence of normal conformal metrics with quasi optimal range of total curvature and precise asymptotic behavior at infinity. If furthermore K is radial symmetric, we establish the same existence result without any growth assumption on K.
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