On the equivariant cohomology of isotropy actions

On the equivariant cohomology of isotropy actions

Let G be a compact connected Lie group and K \subseteq G a closed subgroup. We show that the isotropy action of K on G/K is equivariantly formal and that the space G/K is formal in the sense of rational homotopy theory whenever K is the identity component of the intersection of the fixed point sets...

詳細記述

保存先:
書誌詳細
第一著者: Hagh Shenas Noshari, Sam
その他の著者: Goertsches, Oliver (Prof. Dr.) (論文の指導者)
フォーマット: Dissertation
言語:英語
出版事項: Philipps-Universität Marburg 2018
主題:
Äquivariante Kohomologietheorie
Differentialgeometrie
Mathematik
Symmetric space
equivariant cohomology
Lie-Gruppe
cohomology
Symmetrischer Raum
differential geometry
Lie-Algebra
Kohomologie
Lie group
Lie algebra
Mathematics
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その他の書誌記述
要約:Let G be a compact connected Lie group and K \subseteq G a closed subgroup. We show that the isotropy action of K on G/K is equivariantly formal and that the space G/K is formal in the sense of rational homotopy theory whenever K is the identity component of the intersection of the fixed point sets of two distinct involutions on G, so that G/K is a \mathbb{Z}_2\times\mathbb{Z}_2--symmetric space. If K is the identity component of the fixed point set of a single involution and H \subseteq G is a closed connected subgroup containing K, then we show that the action of K on G/H by left-multiplication is equivariantly formal. The latter statement follows from the well-known special case K = H, but is proved by different means, namely by providing an algebraic model for the equivariant cohomology of certain actions.
物理的記述:68 Seiten
DOI:10.17192/z2018.0496

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