Deformations of generalized complex branes

Abstract

We investigate the formal deformation theory of (rank 1) branes on generalized complex (GC) manifolds. This generalizes, for example, the deformation theory of a complex submanifold in a fixed complex manifold. For each GC brane B on a GC manifold (X,J), we construct a formal (pointed) groupoid DefB(X,J) (defined over a certain category of real Artin algebras) that encodes the formal deformations of B. We study the geometric content of this groupoid in a number of different situations. Using the theory of (bi)semicosimplicial differential graded Lie algebras (DGLAs), we construct for each brane B a DGLA LB that governs the "locally trivializable" deformations of B. As a concrete application of this construction, we prove an unobstructedness result.