Gordana Todorov scite author profile

We introduce a new category C, which we call the cluster category, obtained as a quotient of the bounded derived category D of the module category of a finite-dimensional hereditary algebra H over a field. We show that, in the simply laced Dynkin case, C can be regarded as a natural model for the combinatorics of the corresponding Fomin-Zelevinsky cluster algebra. In this model, the tilting objects correspond to the clusters of Fomin-Zelevinsky. Using approximation theory, we investigate the tilting theory of C, showing that it is more regular than that of the module category itself, and demonstrating an interesting link with the classification of selfinjective algebras of finite representation type. This investigation also enables us to conjecture a generalisation of APR-tilting.

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Cluster categories and duplicated algebras

Assem

Brüstle

Schiffler³

et al. 2006

Journal of Algebra

138

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On the finitistic global dimension conjecture for Artin algebras

Igusa¹,

Todorov²

2005

102

127

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Abstract. We find a simple condition which implies finiteness of (little) finitistic global dimension for artin algebras. As a consequence we obtain a short proof of the finitistic global dimension conjecture for radical cubed zero algebras. The same condition also holds for algebras of representation dimension less then or equal to three. Hence the conjecture holds in that case as well.Let Λ be an Artin algebra (an algebra of finite length over a commutative Artinian ring). We will consider only finitely generated (f.g.) modules over Λ, and hence we will only address the little finitistic global dimension conjecture which states that there exists a uniform bound called f indimΛ for the finite projective dimensions of all f.g. (left) Λ-modules of finite projective dimension. This conjecture implies the Nakayama conjecture. Some of the known cases in which the finitistic global dimension conjecture holds are the radical cubed zero case [GZ] and the monomial relation case [GKK] (see also [IZ], [BFGZ]). The conjecture is also true in the case the category of modules of finite projective dimension is contravariantly finite in the category of all f.g. modules [AR]. However, the converse is not true [IST]. In this paper we give a short proof that sup{pdM | M f.g. with rad 2 M = 0 and pdM < ∞} is finite. This is a generalization of the radical cubed zero case since all syzygies have radical square zero in that case. A thorough overview of the state of both little and big finitistic global dimension conjectures is given by B. Huisgen-Zimmerman [H].As another consequence of the main theorem we prove the finitistic dimension conjecture for algebras with representation dimension repdimΛ ≤ 3. The notion of representation dimension was introduced by M. Auslander [A1]. O. Iyama showed

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Homological theory of idempotent ideals

Auslander¹,

Platzeck²,

Todorov³

1992

Trans. Amer. Math. Soc.

120

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Cluster complexes via semi-invariants

et al. 2009

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We define and study virtual representation spaces for vectors having both positive and negative dimensions at the vertices of a quiver without oriented cycles. We consider the natural semi-invariants on these spaces which we call virtual semi-invariants and prove that they satisfy the three basic theorems: the first fundamental theorem, the saturation theorem and the canonical decomposition theorem. In the special case of Dynkin quivers with n vertices, this gives the fundamental interrelationship between supports of the semi-invariants and the tilting triangulation of the (n − 1)-sphere. Contents

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Gordana Todorov

Tilting theory and cluster combinatorics

Cluster categories and duplicated algebras

On the finitistic global dimension conjecture for Artin algebras

Homological theory of idempotent ideals

Cluster complexes via semi-invariants

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