On the Rouquier dimension of wrapped Fukaya categories and a conjecture of Orlov

Abstract: We study the Rouquier dimension of wrapped Fukaya categories of Liouville manifolds and pairs, and apply this invariant to various problems in algebraic and symplectic geometry. On the algebro-geometric side, we introduce a new method based on symplectic flexibility and mirror symmetry to bound the Rouquier dimension of derived categories of coherent sheaves on certain complex algebraic varieties and stacks. These bounds are sharp in dimension at most $3$ . As an application, we reso… Show more

“…Special cases of Theorem 1.5 had been established in [BC23, BF12, BDM19, BFK19] before Favero-Huang and Hanlon-Hicks-Lazarev proved it in general. The full version of Orlov’s Conjecture states that Theorem 1.5 extends to any smooth quasi-projective variety; see [BC23, §1.2] for a list of known cases of this conjecture.…”

A short proof of the Hanlon-Hicks-Lazarev Theorem

“…Special cases of Theorem 1.5 had been established in [BC23, BF12, BDM19, BFK19] before Favero-Huang and Hanlon-Hicks-Lazarev proved it in general. The full version of Orlov’s Conjecture states that Theorem 1.5 extends to any smooth quasi-projective variety; see [BC23, §1.2] for a list of known cases of this conjecture.…”

A short proof of the Hanlon-Hicks-Lazarev Theorem

Rouquier dimension is Krull dimension for normal toric varieties

Resolutions of toric subvarieties by line bundles and applications