Special Legendrian submanifolds in toric Sasaki-Einstein manifolds
Abstract
We show that every toric Sasaki-Einstein manifold S admits a special Legendrian submanifold L which arises as the link fix(τ) S of the fixed point set fix(τ) of an anti-holomorphic involution τ on the cone C(S). In particular, an irregular toric Sasaki-Einstein manifold S2× S3 has a special Legendrian torus S1× S1. Moreover, we also obtain a special Legendrian submanifold in m(S2× S3) for each m 1.
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