Semiorthogonal decompositions and components of derived categories of orthogonal Grassmannian fibrations

Abstract

Kuznetsov showed that for a flat quadric fibration Q over a smooth base S, Db(Q) admits a semiorthogonal decomposition where one of the components is the derived category of the sheaf of even parts of a Clifford algebra Db(S,Cl0). As progress towards a generalization, we show that for a quadric fibration with a fairly minor condition on the rank of the quadric fibers, the category Db(S,Cl0) embeds fully faithfully into the derived category of the relative orthogonal Grassmannian Db(OGr(k,Q)). When k = 2, we use this to produce a semiorthogonal decomposition of Db(OGr(2,Q)) up to a residual category; we compute this residual category in the smooth case and produce a conjecture for in the case of a pencil of quadrics with smooth base locus.