Nonhomothetic complete periodic metrics with constant scalar curvature

Abstract

We show that there are infinitely many pairwise nonhomothetic, complete, periodic metrics with constant scalar curvature that are conformal to the round metric on Sn Sk, where k < n-22. These metrics are obtained by pulling back Yamabe metrics defined on products of Sn-k-1 and compact hyperbolic (k+1)-manifolds. Our main result proves that these solutions are generically distinct up to homothety. The core of our argument relies on classical rigidity theorems due to Obata and Ferrand, which characterize the round sphere by its conformal group.

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