Stringy K\"ahler moduli, mutation and monodromy
Will Donovan, Michael Wemyss

TL;DR
This paper explores the derived monodromy on the stringy K"ahler moduli space for 3-folds with flopping curves, introducing new helices and symmetries that deepen understanding of noncommutative deformations and derived autoequivalences.
Contribution
It constructs novel infinite helices related to flopping curves, linking them to derived symmetries and monodromy, and applies these to noncommutative deformations and crepant resolutions.
Findings
Helices determine simples and projectives in tilts of perverse sheaves.
Objects in the first helix induce twist autoequivalences.
Proves bounds on Gopakumar-Vafa invariants for flopping curves.
Abstract
This paper gives the first description of derived monodromy on the stringy K\"ahler moduli space (SKMS) for a general irreducible flopping curve C in a 3-fold X with mild singularities. We do this by constructing two new infinite helices: the first consists of sheaves supported on C, and the second comprises vector bundles in a tubular neighbourhood. We prove that these helices determine the simples and projectives in iterated tilts of the category of perverse sheaves, and that all objects in the first helix induce a twist autoequivalence for X. We show that these new derived symmetries, along with established ones, induce the full monodromy on the SKMS. The helices have many further applications. We (1) prove representability of noncommutative deformations of all successive thickenings of a length l flopping curve, via tilting theory, (2) control the representing objects,…
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Taxonomy
TopicsAlgebraic Geometry and Number Theory · Geometry and complex manifolds · Advanced Algebra and Geometry
