Improved Beckner's inequality for axially symmetric functions on Sn
Abstract
In this article we present various uniqueness and existence results for Q-curvature type equations with a Paneitz operator on n in axially symmetric function spaces. In particular, we show uniqueness results for n=6, 8 and improve the best constant of Beckner's inequality in these dimensions for axially symmetric functions under the constraint that their centers of mass are at the origin. As a consequence, the associated first Szeg\"o limit theorem is also proven for axially symmetric functions.
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