Establishes equivariant contact Darboux quotients for -1-shifted derived Artin stacks and constructs categorified Legendrian 2-categories via ell-adic perverse sheaves and Fourier-Mukai functors.
A Derived Legendrian Category for Shifted Contact Stacks
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abstract
We construct the derived Legendrian category $\mathcal{F}_{c}(X)$ for an $n$-shifted contact derived Artin stack $X$ and the $(\infty,2)$-category $Leg_n$ of Legendrian correspondences in the context of derived algebraic geometry, with several applications to moduli theory. In brief, the objects of the category $\mathcal{F}_{c}(X)$ are Legendrian morphisms; the morphism spaces and composition operations are defined using equivariant descent. We also establish that $\mathcal{F}_{c}(X)$ embeds into an $(\infty, 2)$-category of spans defined by the AKSZ construction. We further evaluate topological cobordisms as Lagrangian correspondences to define derived Legendrian surgery.
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math.AG 1years
2026 1verdicts
UNVERDICTED 1representative citing papers
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Equivariant Contact Darboux Quotients and Perversely Categorified Legendrian Correspondences
Establishes equivariant contact Darboux quotients for -1-shifted derived Artin stacks and constructs categorified Legendrian 2-categories via ell-adic perverse sheaves and Fourier-Mukai functors.