Generic density of equivariant min-max hypersurfaces
Abstract
For a compact Riemannian manifold Mn+1 acted isometrically on by a compact Lie group G with cohomogeneity Cohom(G)≥ 2, we show the Weyl asymptotic law for the G-equivariant volume spectrum. As an application, we show in the C∞G-generic sense with a certain dimension assumption that the union of min-max minimal G-hypersurfaces (with free boundary) is dense in M, whose boundaries' union is also dense in ∂ M.
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