2022
DOI: 10.1017/fms.2022.1
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Ginzburg algebras of triangulated surfaces and perverse schobers

Abstract: Ginzburg algebras associated to triangulated surfaces provide a means to categorify the cluster algebras of these surfaces. As shown by Ivan Smith, the finite derived category of such a Ginzburg algebra can be embedded into the Fukaya category of the total space of a Lefschetz fibration over the surface. Inspired by this perspective, we provide a description of the unbounded derived category in terms of a perverse schober. The main novelty is a gluing formalism describing the Ginzburg algebra as a colimit of c… Show more

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Cited by 5 publications
(3 citation statements)
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“…The vector spaces Ψ i , with 1 ď i ď n, are all equivalent and may be chosen for concreteness as the stalks of the n-th roots of unity. An ad-hoc categorification of this local description is described in [Chr22a], based on Waldhausen's relative S ‚ -construction. Using these local descriptions, we can describe perverse sheaves or perverse schobers on any surface S with 0-dimensional strata P and non-empty boundary by choosing a spanning graph G Ă S. The inclusion of G into S is required to be a homotopy equivalence and each stratum p P P is required to be the image of a vertex of G. A perverse sheaf or perverse schober on S can be encoded as a constructible sheaf and cosheaf on G, which restricts at each vertex of G to a diagram as in (5.2.4) or its categorification.…”
Section: Barbacovi's Theorem and Its Geometric Interpretationmentioning
confidence: 99%
See 1 more Smart Citation
“…The vector spaces Ψ i , with 1 ď i ď n, are all equivalent and may be chosen for concreteness as the stalks of the n-th roots of unity. An ad-hoc categorification of this local description is described in [Chr22a], based on Waldhausen's relative S ‚ -construction. Using these local descriptions, we can describe perverse sheaves or perverse schobers on any surface S with 0-dimensional strata P and non-empty boundary by choosing a spanning graph G Ă S. The inclusion of G into S is required to be a homotopy equivalence and each stratum p P P is required to be the image of a vertex of G. A perverse sheaf or perverse schober on S can be encoded as a constructible sheaf and cosheaf on G, which restricts at each vertex of G to a diagram as in (5.2.4) or its categorification.…”
Section: Barbacovi's Theorem and Its Geometric Interpretationmentioning
confidence: 99%
“…Theorem 5.2.3 is a special case of a more general phenomenon exhibited by perverse schobers on a stratified surface S with non-empty boundary. We again choose a spanning graph G of S. By a G-parametrized perverse schober, we mean a constructible sheaf of stable 8-categories on G encoding a perverse schober on S, as explained above and defined in [Chr22a]. Given an edge e of G, we denote by Fpeq the stalk of F at any point on that edge.…”
Section: Barbacovi's Theorem and Its Geometric Interpretationmentioning
confidence: 99%
“…Remark 5.5. For an oriented marked surface with ideal triangulation (S, T ), we denote by G T the associated relative Ginzburg algebra (see [8]). Let S be an oriented marked surface with two ideal triangulation T , T ′ related by a flip of an edge e of T .…”
Section: 1mentioning
confidence: 99%