Equivariant Morse index of min-max G-invariant minimal hypersurfaces

Abstract

For a closed Riemannian manifold Mn+1 with a compact Lie group G acting as isometries, the equivariant min-max theory gives the existence and the potential abundance of minimal G-invariant hypersurfaces provided 3≤ codim(G· p) ≤ 7 for all p∈ M. In this paper, we show a compactness theorem for these min-max minimal G-hypersurfaces and construct a G-invariant Jacobi field on the limit. Combining with an equivariant bumpy metrics theorem, we obtain a C∞G-generic finiteness result for min-max G-hypersurfaces with area uniformly bounded. As a main application, we further generalize the Morse index estimates for min-max minimal hypersurfaces to the equivariant setting. Namely, the closed G-invariant minimal hypersurface ⊂ M constructed by the equivariant min-max on a k-dimensional homotopy class can be chosen to satisfy IndexG()≤ k.