Barycenter technique for the higher order Q-curvature equation

Abstract

Let k1 be an integer, and (M,g) be a smooth, closed Riemannian manifold of dimension 2k+1 n 2k+3, or (M,g) be locally conformally flat of dimension n 2k+1. Applying the Bahri-Coron barycenter method, we show the existence of a conformal metric with constant Q-curvature of order 2k, or equivalently, the existence of a positive solution for the 2k-th order Q-curvature equation involving the GJMS operator Pg. We only assume a natural positivity preserving condition on Pg and do not suppose any condition on the sign of the mass of Pg. In particular, we obtain existence without using a positive mass theorem.

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