On homotopy nilpotency
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Publication:5030992
DOI10.3336/gm.56.2.10zbMath1493.55009OpenAlexW4200053905MaRDI QIDQ5030992
Publication date: 18 February 2022
Published in: Glasnik Matematicki (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.3336/gm.56.2.10
Classification of homotopy type (55P15) Nilpotent groups (20F18) Localization and completion in homotopy theory (55P60) Loop spaces (55P35)
Cites Work
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- Goodwillie calculus via adjunction and LS cocategory
- Central reflections and nilpotency in exact Mal'tsev categories
- Homotopical nilpotency
- Homotopy nilpotency in \(p\)-regular loop spaces
- Homotopy nilpotency in localized \(\text{SU}(n)\)
- Homotopy nilpotent groups
- Nilpotence and stable homotopy theory. I
- Some nilpotent H-spaces
- Homotopy nilpotency and localization
- Lusternik-Schnirelmann cocategory
- Homotopy nilpotent Lie groups have no torsion in homology
- The dual polyhedral product, cocategory and nilpotence
- A torus theorem for homotopy nilpotent loop spaces
- Nilpotence and finite H-spaces
- Homotopy nilpotency of some homogeneous spaces
- Exponents of \([\Omega (\mathbb{S}^{r+1}), \Omega (Y)\)]
- \(Spin\;(n)\) is not homotopy nilpotent for \(n{\geq}7\)
- \(H\)-spaces from a homotopy point of view
- Homotopy limits, completions and localizations
- On mappings into group-like spaces
- On products in homotopy groups
- On exponent and nilpotency of \([\Omega(\mathbb{S}^{r+1}),\Omega(\mathbb{K}P^n)\)]
- ON H-SPACES AND THEIR HOMOTOPY GROUPS
- Lusternik-Schnirelmann Category and Cocategory
- Compositional Methods in Homotopy Groups of Spheres. (AM-49)
- On fibre spaces and nilpotency. II
- Homotopy nilpotency
- Homotopy Nilpotency for Simply Connected Lie Groups
- CLAPP-PUPPE TYPE LUSTERNIK-SCHNIRELMANN (CO)CATEGORY IN A MODEL CATEGORY
- A Note on H-Spaces and Postnikov Systems of Spheres
- Homotopical Nilpotence of S 3
- SOME PROPERTIES OF THE EXOTIC MULTIPLICATIONS ON THE THREE-SPHERE
- Homotopical Nilpotence of the Seven Sphere
- Introduction to homotopy theory
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