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- Acyclic_model abstract "In algebraic topology, a discipline within mathematics, the acyclic models theorem can be used to show that two homology theories are isomorphic. The theorem was developed by topologists Samuel Eilenberg and Saunders MacLane. They discovered that, when topologists were writing proofs to establish equivalence of various homology theories, there were numerous similarities in the processes. Eilenberg and MacLane then discovered the theorem to generalize this process.It can be used to prove the Eilenberg–Zilber theorem.".
- Acyclic_model wikiPageID "19544067".
- Acyclic_model wikiPageRevisionID "474271550".
- Acyclic_model hasPhotoCollection Acyclic_model.
- Acyclic_model subject Category:Homological_algebra.
- Acyclic_model subject Category:Theorems_in_algebraic_topology.
- Acyclic_model type Abstraction100002137.
- Acyclic_model type Communication100033020.
- Acyclic_model type Message106598915.
- Acyclic_model type Proposition106750804.
- Acyclic_model type Statement106722453.
- Acyclic_model type Theorem106752293.
- Acyclic_model type TheoremsInAbstractAlgebra.
- Acyclic_model type TheoremsInAlgebraicTopology.
- Acyclic_model type TheoremsInTopology.
- Acyclic_model comment "In algebraic topology, a discipline within mathematics, the acyclic models theorem can be used to show that two homology theories are isomorphic. The theorem was developed by topologists Samuel Eilenberg and Saunders MacLane. They discovered that, when topologists were writing proofs to establish equivalence of various homology theories, there were numerous similarities in the processes.".
- Acyclic_model label "Acyclic model".
- Acyclic_model sameAs m.04n6hzl.
- Acyclic_model sameAs Q4677985.
- Acyclic_model sameAs Q4677985.
- Acyclic_model sameAs Acyclic_model.
- Acyclic_model wasDerivedFrom Acyclic_model?oldid=474271550.
- Acyclic_model isPrimaryTopicOf Acyclic_model.