I. Castro, C. R. Montealegre, F. Urbano
Published 2001-10-23Version 1
In this paper we construct new examples of minimal Lagrangian submanifolds in the complex hyperbolic space with large symmetry groups, obtaining three 1-parameter families with cohomegeneity one. We characterize them as the only minimal Lagrangian submanifolds in CH^n foliated by umbilical hypersurfaces of Lagrangian subspaces RH^n of CH^n. Several suitable generalizations of the above construction allow us to get new families of minimal Lagrangian submanifolds in CH^n from curves in CH^1 and (n-1)-dimensional minimal Lagrangian submanifolds of the complex space forms CP^n-1, CH^n-1 and C^n-1. Similar constructions are made in the complex projective space.
Comments: 28 pages. To appear in Illinois J. Math
Journal: Illinois Journal of Mathematics, 46 (2002), 695-721
Lagrangian surfaces with circullar ellipse of curvature in complex space forms
Parallel submanifolds of complex projective space and their normal holonomy
Existence and uniqueness of inhomogeneous ruled hypersurfaces with shape operator of constant norm in the complex hyperbolic space
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