Charge of D-branes on singular varieties

Abstract

Considering the D-branes on a variety Z as the objects of the derived category Db(Z), we propose a definition for the charge of D-branes on not necessarily smooth varieties. We define the charge Q( G) of G∈ Db(Z) as an element of the homology of Z, so that the mapping Q is compatible with the pushforward by proper maps between varieties. Given a generic anticanonical hypersurface Y of a toric variety X defined by a reflexive polytope, we express the charge of a line bundle on Y defined by a divisor D of X in terms of intersections of D with cycles determined by the polytope faces.