Hamiltonian actions and homogeneous Lagrangian submanifolds

Abstract: We consider a connected symplectic manifold M acted on properly and in a Hamiltonian fashion by a connected Lie group G. Inspired to the recent paper [3], see also [12] and [24], we study Lagrangian orbits of Hamiltonian actions. The dimension of the moduli space of the Lagrangian orbits is given and we also describe under which condition a Lagrangian orbit is isolated. If M is a compact Kähler manifold we give a necessary and sufficient condition to an isometric action admits a Lagrangian orbit. Then we inves… Show more

“…(iii) K ′ is not semisimple and K ′ = K ′ ss × C(K ′ ) where K ′ ss is semisimple such that K ′ ss does NOT act on S n+1 (1) with cohomogeneity 1. In this case (a) 2)×Spin (7), n = 14, (U, K) = (SO (10), SO(2)×SO( 8)).…”

On Lagrangian submanifolds in complex hyperquadrics and isoparametric hypersurfaces in spheres

“…(iii) K ′ is not semisimple and K ′ = K ′ ss × C(K ′ ) where K ′ ss is semisimple such that K ′ ss does NOT act on S n+1 (1) with cohomogeneity 1. In this case (a) 2)×Spin (7), n = 14, (U, K) = (SO (10), SO(2)×SO( 8)).…”

On Lagrangian submanifolds in complex hyperquadrics and isoparametric hypersurfaces in spheres

Infinitesimally tight Lagrangian orbits