AbstractThis is the second part of a two-part paper developing the module theory, and a theory of complexity and varieties for modules, in the context of Kropholler's class of groupsLHF. The numbering is a continuation of the numbering for the first part4
summary:We investigate the category $\text{mod}\Lambda $ of finite length modules over the ring $\La...
AbstractWe give a characterization of the acyclicity of the second step of a Tate or simplicial reso...
In this paper we determine, for all (Formula presented.) sufficiently large, the irreducible compone...
AbstractThis two-part paper generalizes the usual notion of complexity and varieties for modules ove...
AbstractThis two-part paper generalizes the usual notion of complexity and varieties for modules ove...
AbstractThis is the second part of a two-part paper developing the module theory, and a theory of co...
AbstractLet k be an algebraically closed field of characteristic p > 0 and let G be a finite group. ...
AbstractSuppose that G is a finite group and that k is an algebraically closed field of characterist...
AbstractSuppose that G is a finite group and that k is an algebraically closed field of characterist...
AbstractLet k be an algebraically closed field of characteristic p > 0 and let G be a finite group. ...
Let k be an algebraically closed field of characteristic p> 0. In this lecture we want to take a ...
Let A be a finite-demensional k-algebra over an algebraically closed field k. We denote by mod A the...
We give a presentation of the theory of support varieties for finite dimensional algebras A using th...
In this thesis we study two types of complexity of modules over finite-dimensional algebras. In the...
summary:We investigate the category $\text{mod}\Lambda $ of finite length modules over the ring $\La...
summary:We investigate the category $\text{mod}\Lambda $ of finite length modules over the ring $\La...
AbstractWe give a characterization of the acyclicity of the second step of a Tate or simplicial reso...
In this paper we determine, for all (Formula presented.) sufficiently large, the irreducible compone...
AbstractThis two-part paper generalizes the usual notion of complexity and varieties for modules ove...
AbstractThis two-part paper generalizes the usual notion of complexity and varieties for modules ove...
AbstractThis is the second part of a two-part paper developing the module theory, and a theory of co...
AbstractLet k be an algebraically closed field of characteristic p > 0 and let G be a finite group. ...
AbstractSuppose that G is a finite group and that k is an algebraically closed field of characterist...
AbstractSuppose that G is a finite group and that k is an algebraically closed field of characterist...
AbstractLet k be an algebraically closed field of characteristic p > 0 and let G be a finite group. ...
Let k be an algebraically closed field of characteristic p> 0. In this lecture we want to take a ...
Let A be a finite-demensional k-algebra over an algebraically closed field k. We denote by mod A the...
We give a presentation of the theory of support varieties for finite dimensional algebras A using th...
In this thesis we study two types of complexity of modules over finite-dimensional algebras. In the...
summary:We investigate the category $\text{mod}\Lambda $ of finite length modules over the ring $\La...
summary:We investigate the category $\text{mod}\Lambda $ of finite length modules over the ring $\La...
AbstractWe give a characterization of the acyclicity of the second step of a Tate or simplicial reso...
In this paper we determine, for all (Formula presented.) sufficiently large, the irreducible compone...
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