Hamiltonian stationary cones with isotropic links
Abstract
We show that any closed oriented immersed Hamiltonian stationary isotropic surface with genus g in S5⊂C3 is (1) Legendrian and minimal if g=0; (2) either Legendrian or with exactly 2g-2 Legendrian points if g≥1. In general, every compact oriented immersed isotropic submanifold Ln-1⊂ S2n-1⊂Cn such that the cone C( Ln-1) is Hamiltonian stationary must be Legendrian and minimal if its first Betti number is zero. Corresponding results for non-orientable links are also provided.
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