Litcius/Paper detail

Flops and spherical functors

Agnieszka Bodzenta, Alexey Bondal

2022Compositio Mathematica36 citationsDOIOpen Access PDF

Abstract

We study derived categories of Gorenstein varieties $X$ and $X^+$ connected by a flop. We assume that the flopping contractions $f\colon X\to Y$ , $f^+ \colon X^+ \to Y$ have fibers of dimension bounded by one and $Y$ has canonical hypersurface singularities of multiplicity two. We consider the fiber product $W=X\times _YX^+$ with projections $p\colon W\to X$ , $p^+\colon W\to X^+$ and prove that the flop functors $F = Rp^+_*Lp^* \colon {\mathcal {D}}^b(X) \to {\mathcal {D}}^b(X^+)$ , $F^+= Rp_*L{p^+}^* \colon {\mathcal {D}}^b(X^+) \to {\mathcal {D}}^b(X)$ are equivalences, inverse to those constructed by Van den Bergh. The composite $F^+ \circ F \colon {\mathcal {D}}^b(X) \to {\mathcal {D}}^b(X)$ is a non-trivial auto-equivalence. When variety $Y$ is affine, we present $F^+ \circ F$ as the spherical cotwist of a spherical couple $(\Psi ^*,\Psi )$ which involves a spherical functor $\Psi$ constructed by deriving the inclusion of the null category $\mathscr {A}_f$ of sheaves ${\mathcal {F}} \in \mathop {{\rm Coh}}\nolimits (X)$ with $Rf_*({\mathcal {F}} )=0$ into $\mathop {{\rm Coh}}\nolimits (X)$ . We construct a spherical pair ( ${\mathcal {D}}^b(X)$ , ${\mathcal {D}}^b(X^+)$ ) in the quotient ${\mathcal {D}}^b(W) /{\mathcal {K}}^b$ </jats:inline

Topics & Concepts

FunctorMathematicsCombinatoricsInverseHypersurfaceQuotientGeometryDiscrete mathematicsPure mathematicsAlgebraic structures and combinatorial modelsAlgebraic Geometry and Number TheoryNonlinear Waves and Solitons