On compacta that intersect unstably in Euclidean space
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Publication:1190697
DOI10.1016/0166-8641(92)90139-QzbMath0791.54048MaRDI QIDQ1190697
James E. West, Alexander N. Dranishnikov
Publication date: 26 September 1992
Published in: Topology and its Applications (Search for Journal in Brave)
Function spaces in general topology (54C35) Dimension theory in general topology (54F45) Embedding (54C25) Dimension theory in algebraic topology (55M10) Spanier-Whitehead duality (55P25)
Related Items (7)
On the unstable intersection conjecture ⋮ Dimension of compact metric spaces ⋮ The generator rank of \(C^\ast \)-algebras ⋮ A short elementary proof of the Dranishnikov-West theorem on stable intersection of compacta in Euclidean spaces ⋮ Mappings which are stable with respect to the property \(\dim f(X)\geq k\) ⋮ On approximation and embedding problems for cohomological dimension ⋮ On the dimension of the product of two compacta and the dimension of their intersection in general position in Euclidean space
Cites Work
- Moving compacta in \(\mathbb{R}{}^ m\) apart
- On intersections of compacta of complementary dimensions in Euclidean space
- A cohomological definition for locally compact Hausdorff spaces
- Some m-dimensional compacta admitting a dense set of imbeddings into $R^{2m}$
- Imbeddings into $R^n$ and dimension of products
- ON A PROBLEM OF P. S. ALEKSANDROV
- Homological dimension theory
- On Intersections of Compacta in Euclidean Space
- On some famous examples in dimension theory
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