Flops and spherical functors (1511.00665v2)
Abstract: We study derived categories of Gorenstein varieties X and X+ connected by a flop. We assume that the flopping contractions f: X \to Y, f+: X+ \to Y have fibers of dimension bounded by 1 and Y has canonical hypersurface singularities of multiplicity 2. We consider the fiber product W=X \times_Y X+ with projections p: W \to X, q: W \to X+ and prove that the flop functors F = Rq_* Lp*: Db(X) \to Db(X+), F+= Rp_Lq^: Db(X+) \to Db(X) are equivalences, inverse to those constructed by M. Van den Bergh. The composite F+ \circ F: Db(X) \to Db(X) is a non-trivial auto-equivalence. When variety Y is affine, we present F+\circ F as the spherical cotwist associated to a spherical functor \Psi. The functor \Psi is constructed by deriving the inclusion of the null-category A_f of sheaves F in \Coh (X) with Rf_(F)=0 into Coh (X). We construct a spherical pair (Db(X),Db(X+)) in the quotient Db(W)/Kb, where Kb is the common kernel of the derived push-forwards for the projections to X and X+, thus implementing in geometric terms a schober for the flop. A technical innovation of the paper is the L1f*f_ vanishing for the Van den Bergh's projective generator. We construct a projective generator in the null-category and prove that its endomorphism algebra is the contraction algebra.