Infinitesimal objects associated to Dirac groupoids and their homogeneous spaces

Abstract

Let (G P, DG) be a Dirac groupoid. We show that there are natural Lie algebroid structures on the units A( DG) and on the core I( DG) of the multiplicative Dirac structure. In the Poisson case, the Lie algebroid A*G is isomorphic to A( DG) and in the case of a closed 2-form, the IM-2-form is equivalent to the core algebroid that we find. We construct a vector bundle B( DG) P associated to any (almost) Dirac structure. In the Dirac case, B( DG) has the structure of a Courant algebroid that generalizes the Courant algebroid defined by the Lie bialgebroid of a Poisson groupoid. This Courant algebroid structure is induced in a natural way by the ambient Courant algebroid TG T*G. The already known theorems about one-one correspondence between the homogeneous spaces of a Poisson Lie group (respectively Poisson groupoid, Dirac Lie group) and suitable Lagrangian subspaces of the Lie bialgebra or Lie bialgebroid are generalized to a classification of the Dirac homogeneous spaces of a Dirac groupoid. DG-homogeneous Dirac structures on G/H are related to suitable Dirac structures in B( DG). In the case of almost Dirac structures, we find Lagrangian subspaces of B(DG), that are invariant under an induced action of the bisections of H on B( DG).