Alexis Michelat
Published 2016-03-30Version 1
We obtain an upper bound for the Morse index of Willmore spheres $\Sigma\subset S^3$ coming from an immersion of $S^2$. The quantization of Willmore energy shows that there exists an integer $m$ such that $\mathscr{W}(\Sigma)=4\pi m$. Then we show that $\mathrm{Ind}_{\mathscr{W}}(\Sigma)\leq m$. The proof relies on an explicit computation relating the second derivative of $\mathscr{W}$ for $\Sigma$ with the Jacobi operator of the minimal surface in $\mathbb{R}^3$ it is the image of by stereographic projection thanks of the fundamental classification of Robert Bryant.
On the index of minimal hypersurfaces in $\mathbb{S}^{n+1}$ with $λ_1<n$
Willmore spheres in the 3-sphere revisited
Weighted $\infty$-Willmore Spheres
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