The fibre of the degree 3 map, Anick spaces and the double suspension
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Publication:4971951
DOI10.1017/S001309152000019XzbMath1453.55010arXiv1908.05302OpenAlexW3044191489MaRDI QIDQ4971951
Publication date: 14 October 2020
Published in: Proceedings of the Edinburgh Mathematical Society (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1908.05302
Related Items (3)
Comparing constructions of the classifying space for the fibre of the double suspension ⋮ Infinite families of higher torsion in the homotopy groups of Moore spaces ⋮ One-relator groups and algebras related to polyhedral products
Cites Work
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- An elementary construction of Anick's fibration
- A reformulation of the Arf invariant one mod p problem and applications to atomic spaces
- Two-primary analogues of Selick's theorem and the Kahn-Priddy theorem for the 3-sphere
- On the iterated suspension
- The double suspension and exponents of the homotopy groups of spheres
- A decomposition of \(\pi^*(S^{2p+1};Z/pZ)\)
- Odd primary torsion in \(\pi_k(S^3)\)
- Torsion in homotopy groups
- A homotopy decomposition of the fibre of the squaring map on \(\Omega^3 S^{17}\)
- Small \(H\) spaces related to Moore spaces
- On the sphere of origin of infinite families in the homotopy groups of spheres
- A Case When the Fiber of the Double Suspension is the Double Loops on Anick's Space
- PROPERTIES OF CERTAIN H-SPACES
- SPLITTINGS OF TWO FUNCTION SPACES
- 3-primary exponents
- The non-existence of odd primary Arf invariant elements in stable homotopy
- EHP Spectra and Periodicity. I: Geometric Constructions
- Properties of Anick’s spaces
- The $3$-primary classifying space of the fiber of the double suspension
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