Minimal hypersurfaces in spheres generated by isoparametric foliations
Abstract
We investigate the existence of minimal hypersurfaces in Sn+1 that are generated by the isoparametric foliation of a subsphere Sn. By considering a generalized rotational ansatz formed by the union of homothetic copies of isoparametric leaves, we reduce the minimal surface equation to an ordinary differential equation. We prove that this construction yields a closed embedded minimal hypersurface for any choice of isoparametric hypersurface M ⊂ Sn. The resulting hypersurfaces have the topological type S1 × M, extending the known examples of minimal hypertori (S1× Sk× Sk and S1× Sk× Sl) to a broader class of topologies determined by isoparametric structures.
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