topological construction
C22355
concept
A topological construction is a method or process for building new topological spaces from given ones, typically by applying operations such as products, quotients, subspaces, or identifications.
Observed surface forms (14)
| Surface form | Occurrences |
|---|---|
| 2-dimensional cell complex | 1 |
| concept in topology | 1 |
| construction in 3-manifold topology | 1 |
| construction in algebraic topology | 1 |
| construction in complex geometry | 1 |
| construction in differential geometry | 1 |
| construction in knot theory | 1 |
| construction in metric space theory | 1 |
| construction in topology | 1 |
| topological degree | 1 |
| topological object | 1 |
| topological operation | 1 |
| universal construction | 1 |
| vector bundle construction | 1 |
Instances (17)
| Instance | Via concept surface |
|---|---|
| Alexandrov compactification | — |
| Dehn surgery | topological operation |
| Dehn complex | — |
| Whitney sum | vector bundle construction |
| twistor space | construction in complex geometry |
| Wirtinger presentation of knot groups | construction in knot theory |
| Leray–Schauder degree | topological degree |
| Mayer–Vietoris sequence in de Rham cohomology | construction in differential geometry |
| Kronecker pairing | construction in algebraic topology |
| Thom space construction | — |
| Stone–Čech compactification | — |
| Freudenthal compactification | — |
| Hopf fibration | — |
| Cauchy net | concept in topology |
| Cauchy completion | construction in metric space theory |
| JSJ decomposition | — |
| van Kampen diagram | topological object |