Scheme of lines on a family of 2-dimensional quadrics: geometry and derived category

Abstract

Given a generic family Q of 2-dimensional quadrics over a smooth 3-dimensional base Y we consider the relative Fano scheme M of lines of it. The scheme M has a structure of a generically conic bundle M X over a double covering X Y ramified in the degeneration locus of Q Y. The double covering X Y is singular in a finite number of points (corresponding to the points y ∈ Y such that the quadric Qy degenerates to a union of two planes), the fibers of M over such points are unions of two planes intersecting in a point. The main result of the paper is a construction of a semiorthogonal decomposition for the derived category of coherent sheaves on M. This decomposition has three components, the first is the derived category of a small resolution X+ of singularities of the double covering X Y, the second is a twisted resolution of singularities of X (given by the sheaf of even parts of Clifford algebras on Y), and the third is generated by a completely orthogonal exceptional collection.