Blow-up phenomena for the constant Q/R-curvature equation
Abstract
Let n 25 be an integer. In this paper, we construct a smooth metric g0 on Sn with the property that the set of metrics in the conformal class of g0 having positive scalar curvature and positive constant quotient Q/R is non-compact. Equivalently, we construct families of solutions exhibiting blow-up behavior for the following equation align* P g0u- (n+2 )(n-4 )4 u 2n-4 Lg0u n-2n-4 =0, u>0 \ Sn, align* where P g0 is the Paneitz operator and Lg0=-g0 +n-24(n-1 )Rg0 is the conformal Laplacian of g0.
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