Hopf cyclic cohomology and Hodge theory for proper actions
From MaRDI portal
Publication:380282
DOI10.4171/JNCG/138zbMath1292.58003arXiv1002.4404OpenAlexW2962918828MaRDI QIDQ380282
Xiang Tang, Yi-Jun Yao, Weiping Zhang
Publication date: 13 November 2013
Published in: Journal of Noncommutative Geometry (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1002.4404
Euler characteristicde Rham cohomologyproper actionHopf algebroidcyclic cohomologyHodge theoryinvariant differential form
de Rham theory in global analysis (58A12) Group actions and symmetry properties (58D19) Hodge theory in global analysis (58A14) Noncommutative geometry (à la Connes) (58B34)
Related Items
Hopf cyclic cohomology and Hodge theory for proper actions on complex manifolds ⋮ Hodge theory for non-compact \(G\)-manifolds with boundary ⋮ Positive scalar curvature and Poincaré duality for proper actions ⋮ The Euler characteristic of a transitive Lie algebroid ⋮ Cohomology of coinvariant differential forms ⋮ Hopf cyclic cohomology for noncompact \(G\)-manifolds with boundary ⋮ Elliptic boundary value problem on non-compact G-manifolds
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Secondary characteristic classes and cyclic cohomology of Hopf algebras
- The cyclic theory of Hopf algebroids.
- On the existence of slices for actions of non-compact Lie groups
- Hopf algebroids and secondary characteristic classes
- Hopf algebras, cyclic cohomology and the transverse index theorem
- Differentiable and algebroid cohomology, Van Est isomorphisms, and characteristic classes
- Cyclic cohomology and Hopf algebra symmetry
- Para-Hopf algebroids and their cyclic cohomology
- Geometric quantization for proper actions
- HOPF ALGEBROIDS AND QUANTUM GROUPOIDS
