Add to ORKGIn this thesis, we apply homological methods to the study of groups in two ways: firstly, we generalise the results of [12] to a more general class of categories than posets, including finite groups which satisfy a particular cohomological condition. We then show that the only finite group satisfying this condition is the trivial group, but our results still hold in more generality than the originals, and we suggest a path to further generalisation. Secondly, we study the representation theory of certain groups by passing their actions on certain simplicial complexes to actions on the homologies of those complexes
With the development of Quillen's concept of a closed model category and, in particular, a simplicia...
Written by one of the subject’s foremost experts, this book focuses on the central developments and ...
We classify finitely generated abelian groups and, using simplicial complex, describe various groups...
In this thesis, we apply homological methods to the study of groups in two ways: firstly, we general...
Introducing the representation theory of groups and finite dimensional algebras, this book first s...
We provide a formal framework for the theory of representations of finite groups, as modules over th...
Homological algebra is the study of how to associate sequences of algebraic objects such as abelian ...
We introduce a candidate for the group algebra of a Hausdorff group which plays the same role as the...
We prove that if a finite group G has a representation with fixity f, then it acts freely and homolo...
We introduce a candidate for the group algebra of a Hausdorff group which plays the same role as the...
We introduce a candidate for the group algebra of a Hausdorff group which plays the same role as the...
AbstractIn this paper, we present several algorithms related with the computation of the homology of...
This book is an introduction to the homology theory of topological spaces and discrete groups, focus...
Let Mk be the category of algebras over a unique factorization domain k, and let ind-Affk denote th...
Let Mk be the category of algebras over a unique factorization domain k, and let ind-Affk denote th...
With the development of Quillen's concept of a closed model category and, in particular, a simplicia...
Written by one of the subject’s foremost experts, this book focuses on the central developments and ...
We classify finitely generated abelian groups and, using simplicial complex, describe various groups...
In this thesis, we apply homological methods to the study of groups in two ways: firstly, we general...
Introducing the representation theory of groups and finite dimensional algebras, this book first s...
We provide a formal framework for the theory of representations of finite groups, as modules over th...
Homological algebra is the study of how to associate sequences of algebraic objects such as abelian ...
We introduce a candidate for the group algebra of a Hausdorff group which plays the same role as the...
We prove that if a finite group G has a representation with fixity f, then it acts freely and homolo...
We introduce a candidate for the group algebra of a Hausdorff group which plays the same role as the...
We introduce a candidate for the group algebra of a Hausdorff group which plays the same role as the...
AbstractIn this paper, we present several algorithms related with the computation of the homology of...
This book is an introduction to the homology theory of topological spaces and discrete groups, focus...
Let Mk be the category of algebras over a unique factorization domain k, and let ind-Affk denote th...
Let Mk be the category of algebras over a unique factorization domain k, and let ind-Affk denote th...
With the development of Quillen's concept of a closed model category and, in particular, a simplicia...
Written by one of the subject’s foremost experts, this book focuses on the central developments and ...
We classify finitely generated abelian groups and, using simplicial complex, describe various groups...