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Currently displaying 1 – 5 of 5

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On algebras of strongly unbounded representation type.

Raymundo Bautista — 1985

Commentarii mathematici Helvetici

Derived endo-discrete artin algebras

Raymundo Bautista — 2006

Colloquium Mathematicae

Let Λ be an artin algebra. We prove that for each sequence ${(h_{i})}_{i \in ℤ}$ of non-negative integers there are only a finite number of isomorphism classes of indecomposables $X \in^{b} (Λ)$ , the bounded derived category of Λ, with $l e n g t h_{E (X)} H^{i} (X) = h_{i}$ for all i ∈ ℤ and E(X) the endomorphism ring of X in $^{b} (Λ)$ if and only if $^{b} (M o d Λ)$ , the bounded derived category of the category $M o d Λ$ of all left Λ-modules, has no generic objects in the sense of [4].

On the existence of almost split sequences in subcategories

Raymundo Bautista; Mark Kleiner — 1990

Banach Center Publications

On restrictions of generic modules of tame algebras

Raymundo Bautista; Efrén Pérez; Leonardo Salmerón — 2013

Open Mathematics

Given a convex algebra ∧0 in the tame finite-dimensional basic algebra ∧, over an algebraically closed field, we describe a special type of restriction of the generic ∧-modules.

On Hom-spaces of tame algebras

Raymundo Bautista; Yuriy Drozd; Xiangyong Zeng; Yingbo Zhang — 2007

Open Mathematics

Let Λ be a finite dimensional algebra over an algebraically closed field k and Λ has tame representation type. In this paper, the structure of Hom-spaces of all pairs of indecomposable Λ-modules having dimension smaller than or equal to a fixed natural number is described, and their dimensions are calculated in terms of a finite number of finitely generated Λ-modules and generic Λ-modules. In particular, such spaces are essentially controlled by those of the corresponding generic modules.

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