Bol's type inequality for singular metrics and its application to prescribing Q-curvature problems
Abstract
In this article, we study higher-order Bol's inequality for radial normal solutions to a singular Liouville equation. By applying these inequalities along with compactness arguments, we derive necessary and sufficient conditions for the existence of radial normal solutions to a singular Q-curvature problem. Moreover, under suitable assumptions on the Q-curvature, we obtain uniform bounds on the total Q-curvature.
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