On some manifolds with positive sigma invariants and their realizing conformal classes

Abstract

We prove that the metric of the Riemannian product (Sk(r1)× Sn-k(r2), gnk), r12+r22=1, is a Yamabe metric in its conformal class if, and only if, either gnk is Einstein, or the linear isometric embedding of this manifold into the standard n+1 dimensional sphere is minimal. We combine this result with Simons' gap theorem to show that, for 2≤ k≤ n-2, the conformal class of the product metric with minimal embedding, which is at the upper end of Simons' gap theorem, realizes the sigma invariant of Sk× Sn-k, and that this is the only class that achieves such a value. Similarly, we use coherent minimal isometric embeddings of suitably scaled standard Einstein metrics g on Pn(R), Pn(C), and Pn(H) into unit spheres, and determine the sigma invariant of these projective spaces, prove that in each case the conformal class [g] realizes it, and that this realizing class is unique.

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