A Real Reduction of the Manifold of Bridgeland Stability Conditions

Abstract

Let T be a k-linear triangulated category. The space of Bridgeland stability conditions on T, denoted by Stab(T), forms a complex manifold. In this paper, we introduce an equivalence relation on Stab(T) and study the quotient space Sb(T) := Stab(T)/, which parametrizes what we call reduced stability conditions. We show that Sb(T) admits the structure of a real (possibly non-Hausdorff) manifold of half the dimension of Stab(T). The space Sb(T) preserves the wall-and-chamber structure of Stab(T), but in a significantly simpler form. Moreover, we define a relation on Sb(T), and show that the full stability manifold Stab(T) can be reconstructed from the space Sb(T) together with the additional data . We then focus on the case where T = Db(X), the bounded derived category of coherent sheaves on a smooth polarized variety (X, H). By explicitly describing Sb(X) for varieties X of small dimension, we formulate two equivalent conjectures concerning a family of stability conditions StabH*(X) and their reduced counterparts SbH*(X) on Db(X). We establish some desirable properties for both families. In particular, using a version of the restriction theorem formulated in terms of , we show that the existence of StabH*(X) implies the existence of stability conditions on every smooth subvariety of X.