Constructible sheaves and the Fukaya category

Nadler, David; Zaslow, Eric

doi:10.1090/s0894-0347-08-00612-7

Cited by 201 publications

(281 citation statements)

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“…As explained in appendix C.2 and summarized in figure 32, this twist defines an A-model to M H in complex structure I H ζ=1 . Kapustin and Witten [30] defined a functor (generalized by Gukov and Witten [53]) When M H is a cotangent bundle, Nadler and Zaslow proved that the functor I D provides an equivalence of categories [129]. This statement is expected to be true more generally, and we will assume here that it holds for the fully resolved Higgs and Coulomb branches of 3d N = 4 gauge theories.…”

Section: Relation To Derived Categories Omentioning

confidence: 90%

“…The twists at (0, 1) ∈ CP 1 × CP 1 and at (1, 0) effectively lead to massive A-models on the original 3d Higgs and Coulomb branches, respectively. By a result of Nadler and Zaslow [129] (originating in work of Kapustin and Witten [30]), the categories of branes in these theories are equivalent to the derived module categories O H and O C when M H and M C are cotangent bundles. We expect this equivalence to hold for more general M H and M C as well.…”

Section: Jhep10(2016)108mentioning

confidence: 98%

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Boundaries, mirror symmetry, and symplectic duality in 3d N = 4 $$ \mathcal{N}=4 $$ gauge theory

Bullimore

Dimofte

Gaiotto

et al. 2016

J. High Energ. Phys.

104

229

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Abstract:We introduce several families of N = (2, 2) UV boundary conditions in 3d N = 4 gauge theories and study their IR images in sigma-models to the Higgs and Coulomb branches. In the presence of Omega deformations, a UV boundary condition defines a pair of modules for quantized algebras of chiral Higgs-and Coulomb-branch operators, respectively, whose structure we derive. In the case of abelian theories, we use the formalism of hyperplane arrangements to make our constructions very explicit, and construct a half-BPS interface that implements the action of 3d mirror symmetry on gauge theories and boundary conditions. Finally, by studying two-dimensional compactifications of 3d N = 4 gauge theories and their boundary conditions, we propose a physical origin for symplectic duality -an equivalence of categories of modules associated to families of Higgs and Coulomb branches that has recently appeared in the mathematics literature, and generalizes classic results on Koszul duality in geometric representation theory. We make several predictions about the structure of symplectic duality, and identify Koszul duality as a special case of wall crossing.

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Section: Relation To Derived Categories Omentioning

confidence: 90%

Section: Jhep10(2016)108mentioning

confidence: 98%

Boundaries, mirror symmetry, and symplectic duality in 3d N = 4 $$ \mathcal{N}=4 $$ gauge theory

Bullimore

Dimofte

Gaiotto

et al. 2016

J. High Energ. Phys.

104

229

View full text Add to dashboard Cite

show abstract

“…It was proven in [B, FLTZ] that constructible sheaves on S 1 with this stratification are equivalent to coherent sheaves on P 1 . Since this category of constructible sheaves is equivalent to a Fukaya category on T * (S 1 ), by [NZ,N1], this equivalence is a form of or mirror symmetry.…”

Section: Ribbon Graphs and Hms In One Dimensionmentioning

confidence: 99%

Ribbon graphs and mirror symmetry

Sibilla

Treumann

Zaslow

2014

Sel. Math. New Ser.

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Abstract. Given a ribbon graph Γ with some extra structure, we define, using constructible sheaves, a dg category CPM(Γ) meant to model the Fukaya category of a Riemann surface in the cell of Teichmüller space described by Γ. When Γ is appropriately decorated and admits a combinatorial "torus fibration with section," we construct from Γ a one-dimensional algebraic stack X Γ with toric components. We prove that our model is equivalent to Perf( X Γ ), the dg category of perfect complexes on X Γ .

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“…Note that thanks to Nadler and Zaslow [NZ09], the category D b R-c (k M ) is equivalent to the Fukaya category of the symplectic manifold T * M, and this is another argument to treat sheaves from a microlocal point of view. Acknowledgments The second named author warmly thanks Stéphane Guillermou for helpful discussions.…”

Section: Introductionmentioning

confidence: 99%

Microlocal Euler classes and Hochschild homology

Kashiwara

Schapira

2013

J. Inst. Math. Jussieu

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We define the notion of a trace kernel on a manifold M . Roughly speaking, it is a sheaf on M ×M for which the formalism of Hochschild homology applies. We associate a microlocal Euler class to such a kernel, a cohomology class with values in the relative dualizing complex of the cotangent bundle T * M over M and we prove that this class is functorial with respect to the composition of kernels.This generalizes, unifies and simplifies various results of (relative) index theorems for constructible sheaves, D-modules and elliptic pairs.

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Constructible sheaves and the Fukaya category

Abstract: Let X X be a compact real analytic manifold, and let T ∗ X T^*X be its cotangent bundle. Let S h ( X ) Sh(X) be the triangulated dg category of bounded, constructible complexes of sheaves on X X . In this paper, we develop a Fukaya A ∞ A_\infty -category F u k ( T ∗ … Show more

Cited by 201 publications

References 29 publications

Boundaries, mirror symmetry, and symplectic duality in 3d N = 4 $$ \mathcal{N}=4 $$ gauge theory

Boundaries, mirror symmetry, and symplectic duality in 3d N = 4 $$ \mathcal{N}=4 $$ gauge theory

Ribbon graphs and mirror symmetry

Microlocal Euler classes and Hochschild homology

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