Calibrated Geometry in Hyperkahler Cones, 3-Sasakian Manifolds, and Twistor Spaces

Abstract

We systematically study calibrated geometry in hyperk\"ahler cones C4n+4, their 3-Sasakian links M4n+3, and the corresponding twistor spaces Z4n+2, emphasizing the relationships between submanifold geometries in various spaces. Our analysis emphasizes the role played by a canonical Sp(n)U(1)-structure γ on the twistor space Z. We observe that Re(e- i θ γ) is an S1-family of semi-calibrations, and make a detailed study of their associated calibrated geometries. As an application, we obtain new characterizations of complex Lagrangian and complex isotropic cones in hyperk\"ahler cones, generalizing a result of Ejiri and Tsukada. We also generalize a theorem of Storm on submanifolds of twistor spaces that are Lagrangian with respect to both the K\"ahler-Einstein and nearly-K\"ahler structures.