Extremal metrics for the ${Q}^\prime$-curvature in three dimensions
arXiv:1511.05248 · doi:10.1016/j.crma.2015.12.012
Abstract
We construct contact forms with constant $Q^\prime$-curvature on compact three-dimensional CR manifolds which admit a pseudo-Einstein contact form and satisfy some natural positivity conditions. These contact forms are obtained by minimizing the CR analogue of the $II$-functional from conformal geometry. Two crucial steps are to show that the $P^\prime$-operator can be regarded as an elliptic pseudodifferential operator and to compute the leading order terms of the asymptotic expansion of the Green's function for $\sqrt{P^\prime}$.
Final version; Corrects minor typos; This is an announcement of the main results of arXiv:1511.05013; 5 pages