Calabi product Lagrangian immersions in complex projective space and complex hyperbolic space

Abstract

Starting from two Lagrangian immersions and a Legendre curve γ(t) in S3(1) (or in H13(1)), it is possible to construct a new Lagrangian immersion in CPn (or in CHn), which is called a warped product Lagrangian immersion. When γ(t)=(r1ei(r2r1at), r2ei(- r1r2at)) (or γ(t)=(r1ei(r2r1at), r2ei(r1r2at))), where r1, r2, and a are positive constants with r12+r22=1 (or -r12+r22=-1), we call the new Lagrangian immersion a Calabi product Lagrangian immersion. In this paper, we study the inverse problem: how to determine from the properties of the second fundamental form whether a given Lagrangian immersion of CPn or CHn is a Calabi product Lagrangian immersion. When the Calabi product is minimal, or is Hamiltonian minimal, or has parallel second fundamental form, we give some further characterizations.