Bouc, Serge.
Green Functors and G-sets [electronic resource] / by Serge Bouc. - Berlin, Heidelberg : Springer Berlin Heidelberg, 1997. - VII, 342 p. online resource. - Lecture Notes in Mathematics, 1671 0075-8434 ; . - Lecture Notes in Mathematics, 1671 .
Mackey functors -- Green functors -- The category associated to a green functor -- The algebra associated to a green functor -- Morita equivalence and relative projectivity -- Construction of green functors -- A morita theory -- Composition -- Adjoint constructions -- Adjunction and green functors -- The simple modules -- Centres.
This book provides a definition of Green functors for a finite group G, and of modules over it, in terms of the category of finite G-sets. Some classical constructions, such as the associated categroy or algebra, have a natural interpretation in that framework. Many notions of ring theory can be extended to Green functors (opposite Green functor, bimodules, Morita theory, simple modules, centres,...). There are moreover connections between Green functors for different groups, given by functors associated to bisets. Intended for researchers and students in representation theory of finite groups it requires only basic algebra and category theory, though knowledge of the classical examples of Mackey functors is probably preferable.
9783540695967
10.1007/BFb0095821 doi
Mathematics.
Group theory.
K-theory.
Mathematics.
K-Theory.
Group Theory and Generalizations.
QA612.33
512.66
Green Functors and G-sets [electronic resource] / by Serge Bouc. - Berlin, Heidelberg : Springer Berlin Heidelberg, 1997. - VII, 342 p. online resource. - Lecture Notes in Mathematics, 1671 0075-8434 ; . - Lecture Notes in Mathematics, 1671 .
Mackey functors -- Green functors -- The category associated to a green functor -- The algebra associated to a green functor -- Morita equivalence and relative projectivity -- Construction of green functors -- A morita theory -- Composition -- Adjoint constructions -- Adjunction and green functors -- The simple modules -- Centres.
This book provides a definition of Green functors for a finite group G, and of modules over it, in terms of the category of finite G-sets. Some classical constructions, such as the associated categroy or algebra, have a natural interpretation in that framework. Many notions of ring theory can be extended to Green functors (opposite Green functor, bimodules, Morita theory, simple modules, centres,...). There are moreover connections between Green functors for different groups, given by functors associated to bisets. Intended for researchers and students in representation theory of finite groups it requires only basic algebra and category theory, though knowledge of the classical examples of Mackey functors is probably preferable.
9783540695967
10.1007/BFb0095821 doi
Mathematics.
Group theory.
K-theory.
Mathematics.
K-Theory.
Group Theory and Generalizations.
QA612.33
512.66