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Bibliographische Detailangaben
1. Verfasser: Gianocca, Matilde
Format: Preprint
Veröffentlicht: 2025
Schlagworte:
Online-Zugang:https://arxiv.org/abs/2510.11811
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Inhaltsangabe:
  • A minimal immersion from a surface to $S^3$ can be viewed both as a critical point of the area and of the energy. Although no difference appears at first order, looking at the respective second variations unveils significant differences. It is well known that whenever the first eigenvalue satisfies $λ_1(Σ)\geq2$, the index is $\mathrm{ind}_E(Σ)\leq 4$. The converse implication is much more subtle. We prove that whenever $λ_1(Σ)<\frac{1}{6}$, there exists a vector field $X$, orthogonal to the four Möbius vector fields, with negative second variation. We also prove an arbitrary codimension version of this statement: any immersed minimal surface $Σ\subset S^n$ with first eigenvalue $λ_1(Σ)<\frac{n-2}{2n}$ admits a vector field $X$ orthogonal to the $n+1$ Möbius fields with negative second variation.