Multiplicity one for equivariant min-max theory in prescribed homology classes
Abstract
For a closed Riemannian manifold M with a compact Lie group G acting by isometries, we show a generic multiplicity one theorem in equivariant min-max theory, and show in generic sense that there are infinitely many G-invariant minimal hypersurfaces in a fixed G-homology class. We also establish an equivariant min-max theory for G-invariant hypersurfaces of prescribed mean curvature with G-index upper bounds.
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