Index of compact minimal submanifolds of the Berger spheres

Abstract

The stability and the index of compact minimal submanifolds of the Berger spheres S2n+1τ,\, 0<τ≤ 1, are studied. Unlike the case of the standard sphere (τ=1), where there are no stable compact minimal submanifolds, the Berger spheres have stable ones if and only if τ2≤ 1/2. Moreover, there are no stable compact minimal d-dimensional submanifolds of S2n+1τ when 1 / (d+1) < τ2 ≤ 1 and the stable ones are classified for τ2=1 / (d+1) when the submanifold is embedded. Finally, the compact orientable minimal surfaces of S3τ with index one are classified for 1/3≤τ2≤ 1.

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