Unstable minimal surfaces in $\mathbb{R}^{n}$ and in products of hyperbolic surfaces

Vladimir Marković; Nathaniel Sagman; Peter Smillie

doi:10.4171/cmh/582

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Unstable minimal surfaces in $R^{n}$ and in products of hyperbolic surfaces

Vladimir Marković
University of Oxford, Oxford, UK
Nathaniel Sagman
University of Luxembourg, Esch-sur-Alzette, Luxembourg
Peter Smillie
Heidelberg University, Heidelberg, Germany; Max Planck Institute for Mathematics in the Sciences, Leipzig, Germany

$Unstable minimal surfaces in $\mathbb{R}^{n}$ and in products of hyperbolic surfaces cover$

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Abstract

We prove that every unstable equivariant minimal surface in $R^{n}$ produces a maximal representation of a surface group into $\prod_{i = 1}^{n} PSL (2, R)$ together with an unstable minimal surface in the corresponding product of closed hyperbolic surfaces. To do so, we lift the surface in $R^{n}$ to a surface in a product of $R$ -trees, then deform to a surface in a product of closed hyperbolic surfaces. We show that instability in one context implies instability in the other two.

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Vladimir Marković, Nathaniel Sagman, Peter Smillie, Unstable minimal surfaces in $R^{n}$ and in products of hyperbolic surfaces. Comment. Math. Helv. (2024), published online first

DOI 10.4171/CMH/582