On Hamiltonian stable Lagrangian tori in complex hyperbolic spaces

Abstract

In this paper, we investigate the Hamiltonian-stability of Lagrangian tori in the complex hyperbolic space CHn. We consider a standard Hamiltonian Tn-action on CHn, and show that every Lagrangian Tn-orbits in CHn is H-stable when n≤ 2 and there exist infinitely many H-unstable Tn-orbits when n≥ 3. On the other hand, we prove a monotone Tn-orbit in CHn is H-stable and rigid for any n. Moreover, we see almost all Lagrangian Tn-orbits in CHn are not Hamiltonian volume minimizing when n≥ 3 as well as the case of Cn and CPn.