On the cohomology of local groups
Copyright policy )On the cohomology of local groups
Most known homology theories (e.g. the homology of modules, rings, groups, sheaves, …) have been found to be special cases of a general theory proposed by M. Barr and J. Beck [1], [2]. The aim of this paper is to show that the cohomology of a local group, as defined by W. T. van Est [4], also fits the scheme of Barr and Beck. At the same time it will be shown that local group cohomology is a relative derived functor in the sense of S. Eilenberg and J. C. Moore [3].
- Australian National University Australia
Derived functors and satellites, Other (co)homology theories, Monads (= standard construction, triple or triad), algebras for monads, homology and derived functors for monads
Derived functors and satellites, Other (co)homology theories, Monads (= standard construction, triple or triad), algebras for monads, homology and derived functors for monads
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