Extremising eigenvalues of the GJMS operators in a fixed conformal class

Abstract

Let (M,g) be a closed Riemannian manifold of dimension n≥ 3. If s is a positive integer satisfying 2s<n, we let Pgs be the GJMS operator of order 2s in M. We investigate in this paper the extremal values taken by fixed eigenvalues of Phs as h runs through the whole conformal class [g]. These extremal values -- that we call throughout the paper conformal eigenvalues -- are conformal invariants of (M,g) and optimisers for these problems, when they exist, are known to not be smooth metrics in general. In this paper we develop a general framework that allows us to address the the existence theory for extremals of conformal eigenvalues. We define and investigate eigenvalues for singular conformal metrics, that we call generalised eigenvalues. We develop a new variational framework for renormalised eigenvalues of any index over the set of admissible (singular) conformal factors: we obtain semi-continuity results and Euler-Lagrange equations for local extremals. Using this framework we prove, under mild assumptions on (M,g) and s, several new (non)-existence results for extremals of renormalised eigenvalues over [g]. These include, among other results, a maximisation result for negative eigenvalues, the minimisation of the principal eigenvalue of Pgs and the analysis of the conformal eigenvalues of the round sphere (Sn, g0). We also establish a strong connection between the existence of optimisers and (nodal) solutions of prescribed Q-curvature equations. Our analysis allows any order s 1 and allows Pgs to have kernel. Previous results only covered the cases s=1,2 and k=1,2. Our work strongly generalises these results to any s 1 and to eigenvalues of any order.