Classification of Minimal Immersions of Conformally Flat 3-Tori and 4-Tori in Spheres by The First Eigenfunctions

Abstract

This paper is devoted to the study of minimal immersions of flat n-tori into spheres, especially those immersed by the first eigenfunctions (such immersion is called λ1-minimal immersion), which also play important roles in spectral geometry. It is known that there are only two non-congruent λ1-minimal 2-tori in spheres, which are both flat. For higher dimensional case, the Clifford n-torus in S2n-1 might be the only known example in the literature. In this paper, by discussing the general construction of homogeneous minimal flat n-tori in spheres, we construct many new examples of λ1-minimal flat 3-tori and 4-tori. In contrast to the rigidity in the case of 2-tori, we show that there exists a 2-parameter family of non-congruent λ1-minimal flat 4-tori. It turns out that the examples we constructed exhaust all λ1-minimal immersions of conformally flat 3-tori and 4-tori in spheres. The classification involves some detailed investigations of shortest vectors in lattices, which can also be used to solve the Berger's problem on flat 3-tori and 4-tori. The dilation-invariant functional λ1(g)V(g)2n about the first eignvalue is proved to have maximal value among all flat 3-tori and 4-tori.

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