Invariant Generalized Complex Structures on Flag Manifolds

Abstract

Let G be a complex semi-simple Lie group and form its maximal flag manifold F=G/P=U/T where P is a minimal parabolic subgroup, U a compact real form and T=U P a maximal torus of U. The aim of this paper is to study invariant generalized complex structures on F. We describe the invariant generalized almost complex structures on F and classify which one is integrable. The problem reduces to the study of invariant 4-dimensional generalized almost complex structures restricted to each root space, and for integrability we analyse the Nijenhuis operator for a triple of roots such that its sum is zero. We also conducted a study about twisted generalized complex structures. We define a new bracket `twisted' by a closed 3-form and also define the Nijenhuis operator twisted by . We classify the -integrable generalized complex structure.