Conformal metrics in R2m with constant Q-curvature and arbitrary volume

Abstract

We study the polyharmonic problem m u = eu in R2m, with m ≥ 2. In particular, we prove that for any V > 0, there exist radial solutions of m u = -eu such that ∫ R2m eu dx = V. It implies that for m odd, given arbitrary volume V > 0, there exist conformal metrics g on R2m with positive constant Q-curvature and vol(g) =V. This answers some open questions in Martinazzi's work.