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A construction of complex analytic elliptic cohomology from double free loop spaces
- Source :
- Compositio Mathematica. 157:1853-1897
- Publication Year :
- 2021
- Publisher :
- Wiley, 2021.
-
Abstract
- We construct a complex analytic version of an equivariant cohomology theory which appeared in a paper of Rezk, and which is roughly modelled on the Borel-equivariant cohomology of the double free loop space. The construction is defined on finite, torus-equivariant CW complexes and takes values in coherent holomorphic sheaves over the moduli stack of complex elliptic curves. Our methods involve an inverse limit construction over all finite-dimensional subcomplexes of the double free loop space, following an analogous construction of Kitchloo for single free loop spaces. We show that, for any given complex elliptic curve $\mathcal {C}$, the fiber of our construction over $\mathcal {C}$ is isomorphic to Grojnowski's equivariant elliptic cohomology theory associated to $\mathcal {C}$.
- Subjects :
- Pure mathematics
Algebra and Number Theory
010102 general mathematics
Holomorphic function
Elliptic cohomology
Space (mathematics)
Mathematics::Algebraic Topology
01 natural sciences
Cohomology
Elliptic curve
Mathematics::K-Theory and Homology
0103 physical sciences
FOS: Mathematics
Algebraic Topology (math.AT)
Computer Science::Programming Languages
Equivariant cohomology
Mathematics - Algebraic Topology
010307 mathematical physics
Free loop
0101 mathematics
Mathematics::Symplectic Geometry
Mathematics
Stack (mathematics)
Subjects
Details
- ISSN :
- 15705846 and 0010437X
- Volume :
- 157
- Database :
- OpenAIRE
- Journal :
- Compositio Mathematica
- Accession number :
- edsair.doi.dedup.....95393be0efe6184c373ec27a5fe121ca
- Full Text :
- https://doi.org/10.1112/s0010437x21007363