Some invariant connections on symplectic reductive homogeneous spaces

Abstract

A symplectic reductive homogeneous space is a pair (G/H,), where G/H is a reductive homogeneous G-space and is a G-invariant symplectic form on it. The main examples include symplectic Lie groups, symplectic symmetric spaces, and flag manifolds. This paper focuses on the existence of a natural symplectic connection on (G/H,). First, we introduce a family \∇a,b\(a,b)∈R2 of G-invariant connection on G/H, and establish that ∇0,1 is flat if and only if (G/H,) is locally a symplectic Lie group. Next, we show that among all \∇a,b\(a,b)∈R2, there exists a unique symplectic connection, denoted by ∇s, corresponding to a=b=13, a fact that seems to have previously gone unnoticed. We then compute its curvature and Ricci curvature tensors. Finally, we demonstrate that the SU(3)-invariant preferred symplectic connection of the Wallach flag manifold SU(3)/T2 (from Cahen-Gutt-Rawnsley) coincides with the natural symplectic connection ∇s, which is furthermore Ricci-parallel.