English

On Equivariant Poincar\'e Duality, Gysin Morphisms and Euler Classes

Algebraic Topology 2017-11-13 v6 Group Theory

Abstract

The aim of these notes, originally intended as an appendix to a book on the foundations of equivariant cohomology, is to set up the formalism of the GG-equivariant Poincar\'e duality for oriented GG-manifolds, for any connected compact Lie group GG, following the work of J.-L. Brylinski leading to the spectral sequence ExtgrHG(HG,c(M),HG)HG(M)[dM].\mathop{\rm Extgr}\nolimits_{H_G}(H_{G,\rm c} (M),H_G)\Rightarrow H_{G}(M)[d_{M}]\,. The equivariant Gysin functor (_)!:=ΩG(_)D+(DGM(HG))(\_)_!:=\Omega_{G}(\_)\in\mathcal D^{+}(\mathord{\rm DGM}(H_{G})) (resp. (_):=ΩG,c(_)(\_)_{*}:=\Omega_{G,\rm c}(\_)) is then defined in the category of oriented GG-manifolds and proper maps (resp. unrestricted maps) with values in the derived category of the category of differential graded modules over HGH_{G}, as the composition of the Cartan complex of equivariant differential forms functor ΩG,c(_)\Omega_{G,\rm c}(\_) (resp. ΩG(_)\Omega_{G}(\_)) with the duality functor IRHomHG(_,HG)I\mkern-4.5muR\,{\rm Hom}_{H_{G}}^{\bullet}(\_,H_{G}) and the equivariant Poincar\'e adjunction IDG(M):ΩG(M)[dM]IRHomHG(ΩG,c(M),HG)I\mkern-4.5muD_{G} (M):\Omega_{G} (M)[d_{M}]\to I\mkern-4.5muR\,{\rm Hom}_{H_{G}}^{\bullet}(\Omega_{G,\rm c} (M),H_{G} ) (resp. IDG(M):ΩG,c(M)[dM]IRHomHG(ΩG(M),HG)I\mkern-4.5muD_{G}' (M):\Omega_{G,\rm c} (M)[d_{M}]\to I\mkern-4.5muR\,{\rm Hom}_{H_{G}}^{\bullet}(\Omega_{G} (M),H_{G} )). Equivariant Euler classes are next introduced for any closed embedding i:NMi:N\subseteq M as EuG(N,M):=ii!(1){\rm Eu}_{G}(N,M):=i^{*}i_{!}(1) where ii!:HG(N)HG(N)i^{*}i_{!}:H_{G}(N)\to H_{G}(N) is the push-pull operator. Some localization and fixed point theorems finish the notes. The idea of introducing Gysin morphisms through an equivariant Poincar\'e duality formalism \`a la Grothendieck-Verdier has many theoretical advantages and is somewhat uncommon in the equivariant setting, warranting publication of these notes.

Keywords

Cite

@article{arxiv.1702.03889,
  title  = {On Equivariant Poincar\'e Duality, Gysin Morphisms and Euler Classes},
  author = {Alberto Arabia},
  journal= {arXiv preprint arXiv:1702.03889},
  year   = {2017}
}

Comments

80 pages, 4 figures

R2 v1 2026-06-22T18:17:09.688Z