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EspañolCOMBINATORIAL TOPOLOGY
In mathematics, 'combinatorial topology' was an older name for algebraic topology, dating from the time when topological invariants of spaces (for example the Betti numbers) were regarded as derived from combinatorial decompositions such as simplicial complexes. After the proof of the simplicial approximation theorem this approach provided rigour.
The change of name reflected the move to organise topological classes such as cycles modulo boundaries explicitly into abelian groups. This point of view is often attributed to Emmy Noether[1], and so the change of title may reflect her influence. The transition is also attributed to the work of Heinz Hopf[2].
A fairly precise date can be supplied in the internal notes of the Bourbaki group. While topology was still ''combinatorial'' in 1942, it had become ''algebraic'' by 1944[3].
1. For example ''L'émergence de la notion de group d'homologie'', Nicolas Basbois (PDF), in French, note 41, explicitly names Noether as inventing the homology group.
2. [1], in French.
3. ''Bourbaki and Algebraic Topology'' by John McCleary (PDF) gives documentation (translated into English from French originals).
★ EoM page
The change of name reflected the move to organise topological classes such as cycles modulo boundaries explicitly into abelian groups. This point of view is often attributed to Emmy Noether[1], and so the change of title may reflect her influence. The transition is also attributed to the work of Heinz Hopf[2].
A fairly precise date can be supplied in the internal notes of the Bourbaki group. While topology was still ''combinatorial'' in 1942, it had become ''algebraic'' by 1944[3].
| Contents |
| Notes |
| External link |
Notes
1. For example ''L'émergence de la notion de group d'homologie'', Nicolas Basbois (PDF), in French, note 41, explicitly names Noether as inventing the homology group.
2. [1], in French.
3. ''Bourbaki and Algebraic Topology'' by John McCleary (PDF) gives documentation (translated into English from French originals).
External link
★ EoM page
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