Derived categories of Quot schemes of locally free quotients, I

Abstract: This paper studies the derived category of the Quot scheme of rank d locally free quotients of a sheaf G of homological dimension ≤ 1 over a scheme X. In particular, we propose a conjecture about the structure of its derived category and verify the conjecture in various cases. This framework allows us to relax certain regularity conditions on various known formulae -such as the ones for blowups (along Koszul-regular centers), Cayley's trick, standard flips, projectivizations, and Grassmannain-flips -and supple… Show more

“…The incarnation with derived algebraic geometry is inspired by the work of Porta-Sala [24], Diaconescu-Porta-Sala [6] and Toda [30,31,32,33] on the categorified Hall algebra. Toda [33] proved a recent conjecture of Jiang [15], which obtained a semiorthogonal decomposition the derived category of Grassmanians over a cohomological dimension 1 coherent sheaf. As an application, Koseki [16] obtained a categorical blow-up formula for Hilbert schemes of points on a smooth algebraic surface.…”

Moduli Space of Sheaves and Categorified Commutator of Functors

“…The incarnation with derived algebraic geometry is inspired by the work of Porta-Sala [24], Diaconescu-Porta-Sala [6] and Toda [30,31,32,33] on the categorified Hall algebra. Toda [33] proved a recent conjecture of Jiang [15], which obtained a semiorthogonal decomposition the derived category of Grassmanians over a cohomological dimension 1 coherent sheaf. As an application, Koseki [16] obtained a categorical blow-up formula for Hilbert schemes of points on a smooth algebraic surface.…”

Moduli Space of Sheaves and Categorified Commutator of Functors

“…The above result is conjectured by Qingyuan Jiang [Jia,Conjecture A.5]. The case of d = 1 is called projectivization formula and proved in [Kuz07, Theorem 5.5], [JL,Theorem 3.4], [Todb, Theorem 4.6.11].…”

“…The case of d = 1 is called projectivization formula and proved in [Kuz07, Theorem 5.5], [JL,Theorem 3.4], [Todb, Theorem 4.6.11]. The d = 2 case is proved in [Jia,Theorem 6.19]. The Quot formula in Theorem 1.1 gives a unified treatment of several known formulas such as Bondal-Orlov standard flip formula [BO], Kapranov exceptional collection for Grassmannian [Kap84], projectivization formula [Kuz07, JL, Todb], semiorthogonal decomposition of Grassmannian flip [BCF + 21, Todc] or so on (see [Jia,Section 1.4.2] for details).…”

“…In [Jia, Conjecture A.5], the conjecture is stated for derived categories of the classical truncations Quot X,d (G ), Quot X,d (H ) under some Tor-independent condition. The Tor-independent condition implies that their dimensions coincide with the virtual dimensions (see [Jia,Lemma 6.7]), so in this case they are equivalent to Quot X,d (G ), Quot X,d (H ). Therefore under the above Torindependent condition, we can replace the derived schemes in Theorem 1.1 with their classical truncations.…”

“…Applications. The Quot formula in Theorem 1.1 has lots of applications on derived categories of classical moduli spaces (see [Jia,Section 1.5]). Here we mention two examples: one is a generalization of [Tod21,Corollary 5.11] and [Jia, Corollary 1.3] on semiorthogonal decompositions of varieties associated with Brill-Noether loci for curves, and the another one is a categorical blow-up formula of Hilbert schemes of points on surfaces obtained by Koseki [Kos].…”

Derived categories of Quot schemes of locally free quotients via categorified Hall products

On the Chow Theory of Projectivizations