Minimal spheres and scalar curvature

Abstract

In 1982, S.-T. Yau conjectured that there exist four distinct embedded minimal two-spheres in any manifold diffeomorphic to S3. Wang-Zhou confirmed this conjecture for Riemannian three-spheres when the metric is bumpy or has positive Ricci curvature. We prove the following quantitative version of their theorem. Suppose that (S3,g) has positive Ricci curvature and scalar curvature Rg Λ0>0. Then there exist four distinct embedded minimal two-spheres Σ1,…,Σ4⊂ (S3,g) such that areag(Σi) 12π(i+1)/Λ0 for every i=1,…,4. We apply this result to a problem posed by S.-T. Yau in 1987 on whether the planar two-spheres are the only minimal spheres in ellipsoids centered at the origin in R4. Haslhofer-Ketover proved that ellipsoids with one sufficiently large semi-axis contain at least one non-planar embedded minimal two-sphere. We prove that such ellipsoids contain at least three non-planar embedded minimal two-spheres.