Regularity of Cohomogeneity two equivariant isotopy minimization problems and minimal hypersurfaces with large first Betti number on spheres
Abstract
We prove the regularity of cohomogeneity two equivariant isotopy minimization problems. Based on this, we develop cohomogeneity two equivariant min-max theory for minimal hypersurfaces proposed by Pitts and Rubinstein in 1988. As an application, for g 1 and 4 n+1 7, we construct minimal hypersurfaces gn on round spheres Sn+1 with (SO(n-1) × Dg+1)-symmetry. For sufficiently large g, gn is a sequence of minimal hypersurfaces with arbitrarily large Betti numbers of topological type \#2g (S1 × Sn-1) or \#2g+2 (S1 × Sn-1), which converges to a union of Sn and a Clifford hypersurface 1nS1 × n-1n Sn-1 or 2nS2 × n-2n Sn-2. In particular, for dimensions 5 and 6, gn has a topological type \#2g (S1 × Sn-1).
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