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Index and nullity of minimal surface doublings, I

Published 8 Dec 2025 in math.DG | (2512.07734v1)

Abstract: We prove that for any large enough $m \in\mathbb{N}$, the genus $γ=m+1$ equator-poles minimal surface doubling of the equatorial two-sphere $Σ0 = \mathbb{S}2_{\mathrm{eq}}$ in the round three-sphere $\mathbb{S}3$, which has two catenoidal bridges at the poles and $m$ bridges equidistributed along the equatorial circle $\mathscr{C}$ of $Σ0 $ and was discovered in earlier work of Kapouleas, has index $2γ+5=2m+7$ and nullity $6$, and so it has no exceptional Jacobi fields and is $C1$-isolated.

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