Minimal submanifolds in spheres and complex-valued eigenfunctions

Abstract

A new approach for constructing minimal submanifolds of codimension 1 in the round spheres is proposed. In the case of S3 two immersions of the Clifford torus and all Lawson τn, m surfaces are described in terms of (λ, μ)-eigenfunctions. Also, a new proof of a theorem that describes (λ, μ)-eigenfunctions on sphere is obtained. This proof is based on a statement that a function f is a (λ, μ)-eigenfunction if and only if f and f2 are eigenfunctions for the Laplace-Beltrami operator.

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