We consider a connected symplectic manifold $M$ acted on properly and in a
Hamiltonian fashion by a connected Lie group $G$. Inspired by recent results, we
study Lagrangian orbits of Hamiltonian actions. The dimension of the moduli
space of the Lagrangian orbits is given. Also, we describe under which condition
a Lagrangian orbit is isolated. If $M$ is a compact Kähler manifold,
we give a necessary and sufficient condition for an isometric action to admit a
Lagrangian orbit. Then we investigate homogeneous Lagrangian submanifolds on the
symplectic cut and on the symplectic reduction. As an application of our
results, we exhibit new examples of homogeneous Lagrangian submanifolds on the
blow-up at one point of the complex projective space and on the weighted
projective spaces. Finally, applying our result which may be regarded as
Lagrangian slice theorem for a Hamiltonian group action with a fixed
point, we give new examples of homogeneous Lagrangian submanifolds on
irreducible Hermitian symmetric spaces of compact or noncompact type.