Geometric approach to stable homotopy groups of spheres. Kervaire invariants. II.
DOI10.1007/s10958-009-9468-1zbMath1182.55013arXiv0801.1417OpenAlexW1995131642MaRDI QIDQ843617
Publication date: 15 January 2010
Published in: Journal of Mathematical Sciences (New York) (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/0801.1417
characteristic classesframed bordismKervaire invariant\((\mathbb{Z}/2\oplus \mathbb{Z}/4)\)-structure\(\mathbf{D}_4\)-framed immersioncyclic immersiongeometric \((\mathbb{Z}/2\oplus \mathbb{Z}/2)\)-control
Embeddings in differential topology (57R40) Other types of cobordism (57R90) Stable homotopy groups (55Q10) Hopf invariants (55Q25) (J)-morphism (55Q50) Stable homotopy of spheres (55Q45) Whitehead products and generalizations (55Q15)
Cites Work
- The Kervaire invariant of immersions
- On Generalizing Boy's Surface: Constructing a Generator of the Third Stable Stem
- Codimension one immersions and the Kervaire invariant one problem
- Topology of ∑1, 1-singular maps
- Surgery on Codimension One Immersions in R n+1 : Removing n-Tuple Points
- The relationship between framed bordism and skew-framed bordism
- The Kervaire invariant problem
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