AbstractWe develop the homological algebra of coefficient systems on a group, in particular from the point of view of calculating higher limits. We show how various sequences of modules associated to a class of subgroups of a given group can be analysed by methods from homological algebra. We are particularly interested in when these sequences are exact, or, if not, when their homology is equal to the higher limits of the coefficient system
This chapter discusses the cohomology of groups. The cohomology of groups is one of the crossroads o...
We use Janelidze's Categorical Galois Theory to extend Brown and Ellis's higher Hopf formulae for ho...
In this thesis, we apply homological methods to the study of groups in two ways: firstly, we general...
We develop the homological algebra of coefficient systems on a group, in particular from the point o...
AbstractWe construct a spectral sequence which relates the Bredon (co)homology groups of a group G w...
Homological algebra is the study of how to associate sequences of algebraic objects such as abelian ...
AbstractWe construct a spectral sequence which relates the Bredon (co)homology groups of a group G w...
For certain contractible G-CW-complexes and F a family of subgroups of G, we construct a spectral se...
AbstractThe homology of a homotopy inverse limit can be studied by a spectral sequence which has as ...
We introduce cohomology and homology theories for small categories with general coefficient systems ...
We define a homological and cohomological dimension of groups in the context of Bredon homology and ...
We introduce cohomology and homology theories for small categories with general coefficient systems ...
It is proved that the homology and cohomology theories of groups and associative algebras are non-ab...
In this work we approach some essential concepts and results of homological algebra, such as the con...
Abstract: The homology of a homotopy inverse limit can be studied by a spectral sequence with has E2...
This chapter discusses the cohomology of groups. The cohomology of groups is one of the crossroads o...
We use Janelidze's Categorical Galois Theory to extend Brown and Ellis's higher Hopf formulae for ho...
In this thesis, we apply homological methods to the study of groups in two ways: firstly, we general...
We develop the homological algebra of coefficient systems on a group, in particular from the point o...
AbstractWe construct a spectral sequence which relates the Bredon (co)homology groups of a group G w...
Homological algebra is the study of how to associate sequences of algebraic objects such as abelian ...
AbstractWe construct a spectral sequence which relates the Bredon (co)homology groups of a group G w...
For certain contractible G-CW-complexes and F a family of subgroups of G, we construct a spectral se...
AbstractThe homology of a homotopy inverse limit can be studied by a spectral sequence which has as ...
We introduce cohomology and homology theories for small categories with general coefficient systems ...
We define a homological and cohomological dimension of groups in the context of Bredon homology and ...
We introduce cohomology and homology theories for small categories with general coefficient systems ...
It is proved that the homology and cohomology theories of groups and associative algebras are non-ab...
In this work we approach some essential concepts and results of homological algebra, such as the con...
Abstract: The homology of a homotopy inverse limit can be studied by a spectral sequence with has E2...
This chapter discusses the cohomology of groups. The cohomology of groups is one of the crossroads o...
We use Janelidze's Categorical Galois Theory to extend Brown and Ellis's higher Hopf formulae for ho...
In this thesis, we apply homological methods to the study of groups in two ways: firstly, we general...
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