Hochschild cohomology of algebras arising from categories and from bounded quivers

Abstract: The main objective of this paper is to provide a theory for computing the Hochschild cohomology of algebras arising from a linear category with finitely many objects and zero compositions. For this purpose, we consider such a category using an ad hoc quiver Q, with an algebra associated to each vertex and a bimodule to each arrow. The computation relies on cohomological functors that we introduce, and on the combinatorics of the quiver. One point extensions are occurrences of this situation, and Happel's long … Show more

“…On the other hand the category of k-algebras with an idempotent is as follows. 4 generalises to an algebra with a finite complete set of orthogonal idempotents (non necessarily primitive), see for instance [15,19].…”

“…15 The morphism β of a strongly stratifying Morita context is β : 0 → B which is of course injective. Therefore strongly stratifying Morita contexts are indeed stratifying.Proposition 2.16 Let Λ be an algebra with a distinguished idempotent e, and let…”

Deleting or adding arrows of a bound quiver algebra and Hochschild (co)homology

“…On the other hand the category of k-algebras with an idempotent is as follows. 4 generalises to an algebra with a finite complete set of orthogonal idempotents (non necessarily primitive), see for instance [15,19].…”

“…15 The morphism β of a strongly stratifying Morita context is β : 0 → B which is of course injective. Therefore strongly stratifying Morita contexts are indeed stratifying.Proposition 2.16 Let Λ be an algebra with a distinguished idempotent e, and let…”

Deleting or adding arrows of a bound quiver algebra and Hochschild (co)homology

Strongly stratifying ideals, Morita contexts and Hochschild homology