Algebraic foliations and derived geometry: the Riemann-Hilbert correspondence
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Publication:2093219
DOI10.1007/s00029-022-00808-9OpenAlexW3000688211MaRDI QIDQ2093219
Gabriele Vezzosi, Bertrand Toën
Publication date: 7 November 2022
Published in: Selecta Mathematica. New Series (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2001.05450
Related Items (3)
A \(t\)-structure on the \(\infty\)-category of mixed graded modules ⋮ Cogroupoid structures on the circle and the Hodge degeneration ⋮ Strictification and gluing of Lagrangian distributions on derived schemes with shifted symplectic forms
Cites Work
- A formal Frobenius theorem and argument shift
- Structure of foliation singularities
- Frobenius avec singularites. II: Le cas général
- log Betti cohomology, log étale cohomology, and log de Rham cohomology of log schemes over \(\mathbb{C}\)
- Homotopical algebra for Lie algebroids
- Chern characters, equivariant traces and derived algebraic geometry
- Equations différentielles à points singuliers réguliers
- Symplectic and Poisson derived geometry and deformation quantization
- Coherence of Direct Images of the De Rham Complex
- Shifted Poisson structures and deformation quantization
- GAGA theorems in derived complex geometry
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