Compactness of conformal metrics with constant Q-curvature of higher order

Abstract

Let k1 be a positive integer and let Pg be the GJMS operator Pg of order 2k on a closed Riemannian manifold (M,g) of dimension n>2k. We investigate the compactness of the set of conformal metrics to g with prescribed constant positive Q-curvature of order 2k- or, equivalently, of the set of positive solutions for the 2k-th order Q-curvature equation. Under a natural positivity-preserving condition on Pg we establish compactness, for an arbitrary 1 k < n2, under the following assumptions: (M,g) is locally conformally flat and Pg has positive mass in M, or 2k+1 n 2k+5 and Pg has positive mass in M, or n 2k+4 and |Wg|g >0 in M. For an arbitrary 1 k < n2, the expression of Pg is not explicit, which is an obstacle to proving compactness. We overcome this by relying on Juhl's celebrated recursive formulae for Pg to perform a refined blow-up analysis for solutions of the Q-curvature equation and to prove a Weyl vanishing result for Pg. This is the first compactness result for an arbitrary 1 k < n2 and the first successful instance where Juhl's formulae are used to yield compactness. Our result also hints that the threshold dimension for compactness for the 2k-th order Q-curvature equation diverges as k + ∞.

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