Obstructions to approximating maps of \(n\)-manifolds into \(\mathbb{R}^{2n}\) by embeddings
From MaRDI portal
Publication:697584
DOI10.1016/S0166-8641(01)00164-XzbMath1003.57036OpenAlexW2024962218MaRDI QIDQ697584
Dušan D. Repovš, Peter M. Akhmetiev, Arkadij B. Skopenkov
Publication date: 17 September 2002
Published in: Topology and its Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/s0166-8641(01)00164-x
Lua error in Module:PublicationMSCList at line 37: attempt to index local 'msc_result' (a nil value).
Related Items (5)
Transverse fundamental group and projected embeddings ⋮ On approximability by embeddings of cycles in the plane. ⋮ Stability of intersections of graphs in the plane and the van Kampen obstruction ⋮ Projected and near-projected embeddings ⋮ On maps with unstable singularities
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Embedding \(T^ n\)-like continua in Euclidean space
- A la recherche de la topologie perdue. 1: Du côté de chez Rohlin. 2: Le côté de Casson
- Moving compacta in \(\mathbb{R}{}^ m\) apart
- A deleted product criterion for approximability of maps by embeddings
- Open problems on graphs arising from geometric topology
- prem-mappings, triple self-intersection points of oriented surfaces, and the Rokhlin signature theorem
- Note on double points of immersions
- Plongements de polyedres dans le domaine metastable
- On the cobordism groups of immersions and embeddings
- A Topological Picturebook
- Normal Euler classes of knotted surfaces and triple points on projections
- On isotopic and discrete realizations of maps of an $ n$-dimensional sphere in Euclidean space
- On the deleted product criterion for embeddability in ℝ^{𝕞}
- SMOOTH IMMERSIONS OF MANIFOLDS OF LOW DIMENSION
- On uncountable collections of continua and their span
- Realization of mappings
- Cobordism groups of immersions
This page was built for publication: Obstructions to approximating maps of \(n\)-manifolds into \(\mathbb{R}^{2n}\) by embeddings
