Representations of categories and their applications

“…This raises the question how to generalise vertices and sources to arbitrary indecomposable modules over the category algebra kC. For finite EI-categories, Fei Xu has developed in [26] a notion of vertices and sources, where the vertices are certain full subcategories.…”

Section: Theorem 11 Let K Be a Commutative Ring And C A Finite Catementioning

confidence: 99%

On simple modules over twisted finite category algebras

Linckelmann

Stolorz

2012

Proc. Amer. Math. Soc.

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Abstract. The purpose of this paper is to show that the recent proof by Ganyushkin, Mazorchuk and Steinberg of the parametrisation of simple modules over finite semigroup algebras due to Clifford, Munn and Ponizovskiȋ carries over to twisted finite category algebras. We observe that the parametrisations of simple modules over Brauer algebras, Temperley-Lieb algebras, and Jones algebras due to Graham and Lehrer can be obtained as special cases of our main result. We further note that the notion of weights in the context of Alperin's weight conjecture extends to twisted finite category algebras.

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“…We want to compare the cohomology rings of C and of its various subcategories. In [5,16,12,32] the authors studied the case where D ⊂ C is a full subcategory which has fewer objects, and showed under certain assumptions one can have H * (C) ∼ = H * (D). Here we investigate subcategories D ⊂ C with the same set of objects but with fewer morphisms.…”

Section: Comparing the Cohomology Of A Category With Those Of Its Submentioning

confidence: 99%

“…We denote by C-mod the abelian category of all covariant functors from C to Ab. The nth cohomology group of C with coefficients in a functor F ∈ C-mod, H n (C; F), can be defined as the nth higher inverse limit lim ← − n C F [2,14,26,32]. If A is an abelian group and A is the corresponding constant functor which sends every object to A and every morphism to the identity, then H n (C; A) ∼ = H n (|C|, A), where |C| is the topological realization of NC-the nerve of C. We are particularly interested in the case where A is a commutative ring with identity, because then H * (C; A) ∼ = H * (|C|, A) will become a graded commutative ring.…”

Section: Introductionmentioning

confidence: 99%

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On the cohomology rings of small categories

2008

Journal of Pure and Applied Algebra

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Communicated by M. Broué MSC: 16E30 18A25 18A40 20J06 20J99a b s t r a c t Let C be a small category and R a commutative ring with identity. The cohomology ring of C with coefficients in R is defined as the cohomology ring of the topological realization of its nerve. First we give an example showing that this ring modulo nilpotents is not finitely generated in general, even when the category is finite EI. Then we study the relationship between the cohomology ring of a category and those of its subcategories and extensions. The main results generalize certain theorems in group cohomology theory.

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Representations of categories and their applications

Cited by 23 publications

References 30 publications

A generalized Koszul theory and its application

A generalized Koszul theory and its application

On simple modules over twisted finite category algebras

On the cohomology rings of small categories

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