1995
DOI: 10.1090/s0002-9947-1995-1261590-5
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The structure of Mackey functors

Abstract: Abstract.Mackey functors are a framework having the common properties of many natural constructions for finite groups, such as group cohomology, representation rings, the Burnside ring, the topological K-theory of classifying spaces, the algebraic K-theory of group rings, the Witt rings of Galois extensions, etc. In this work we first show that the Mackey functors for a group may be identified with the modules for a certain algebra, called the Mackey algebra. The study of Mackey functors is thus the same thing… Show more

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Cited by 97 publications
(155 citation statements)
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“…Since the multiplicity of a simple functor as a composition factor in another functor M is determined by the modules M (G) as G varies (using the method of [32] and [31]), we see that the composition factors of ∆ H,V * are the duals of the composition factors of ∆ H,V , and these are the same as the composition factors of ∇ H,V . In fact, we see that to guarantee the symmetry of Cartan invariants such as…”
Section: Proof (1) This Is An Application Of the Dualitymentioning
confidence: 97%
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“…Since the multiplicity of a simple functor as a composition factor in another functor M is determined by the modules M (G) as G varies (using the method of [32] and [31]), we see that the composition factors of ∆ H,V * are the duals of the composition factors of ∆ H,V , and these are the same as the composition factors of ∇ H,V . In fact, we see that to guarantee the symmetry of Cartan invariants such as…”
Section: Proof (1) This Is An Application Of the Dualitymentioning
confidence: 97%
“…The approach we take is exactly the same as in [31,Section 14] and the arguments presented there go through here also. Theorem 5.10.…”
Section: And So Its Left Adjoint Factors As a Composite Of Left Adjointsmentioning
confidence: 99%
“…It is an associative algebra with the property that the category μ R (G)-Mod of left μ R (G)-modules is equivalent to the category Mack R (G) of Mackey functors for G over R. 2.4. Thévenaz and Webb have also shown ( [13], Theorem 10.1) that there is an equivalence of abelian categories…”
Section: 3mentioning
confidence: 92%
“…It has been shown by J. Thévenaz and P. Webb ( [13]), among many fundamental other results, that the category of Mackey functors for G over R is equivalent to the category of modules over the Mackey algebra μ R (G). This algebra shares many properties with the group algebra RG: it is free as an R-module, and its R-rank does not depend on R; if K is a field of characteristic 0 or coprime to the order of G, the algebra μ K (G) is semisimple; when (K, O, k) is a p-modular system, there is a decomposition theory from Mackey functors for G over K to Mackey functors for G over k; the Cartan matrix of μ k (G) is symmetric and nonsingular.…”
Section: 1mentioning
confidence: 99%
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