Isometric deformations of minimal surfaces in S4
Abstract
We consider the isometric deformation problem for oriented non simply connected immersed minimal surfaces f:M S4. We prove that the space of all isometric minimal immersions of M into S4 with the same normal curvature function is, within congruences, either finite or a circle. Furthermore, we show that for any compact immersed minimal surface in S4 with nontrivial normal bundle there are at most finitely many noncongruent immersed minimal surfaces in S4 isometric to it with the same normal curvature function.
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