The Weil-Moore anima refines the Weil group into a space with higher homotopy groups to improve its cohomological behavior for number fields.
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Proves that G_m-equivariant quotients of derived symplectic spaces descend to contact structures and establishes a derived Legendrian intersection theorem with applications to moduli stacks including Higgs bundles and local systems.
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Weil-Moore anima
The Weil-Moore anima refines the Weil group into a space with higher homotopy groups to improve its cohomological behavior for number fields.
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Equivariant Quotients of Derived Symplectic Spaces and Legendrian Intersection Theorem
Proves that G_m-equivariant quotients of derived symplectic spaces descend to contact structures and establishes a derived Legendrian intersection theorem with applications to moduli stacks including Higgs bundles and local systems.
- Note on factorization categories