Localization in Coalgebras: Applications to Finiteness Conditions

Gómez-Torrecillas, José; Năstăsescu, C.; Torrecillas, Blas

doi:10.1142/s0219498807002156

Cited by 16 publications

(25 citation statements)

References 12 publications

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“…It is also shown there that the second inclusion is strict ([GNT, Example 1.5]), and it is also remarked that the inclusion between Artinian comodules and quasi-finite comodules is also strict ( [GNT,Remark 1.7]). The three classes coincide over an almost connected coalgebra (i.e.…”

Section: Noetherian and Artinian Objectsmentioning

confidence: 99%

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Triangular matrix coalgebras and applications

Iovanov

2013

Linear and Multilinear Algebra

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Abstract. We formally introduce and study generalized comatrix coalgebras and upper triangular comatrix coalgebras, which are not only a dualization but also an extension of classical generalized matrix algebras. We use these to answer several open questions on Noetherian and Artinian type notions in the theory of coalgebras, and to give complete connections between these. We also solve completely the so called finite splitting problem for coalgebras: we show that C is a coalgebra such that the rational part of every left finitely generated C * -module splits off if and only if C = D M 0 E is an upper triangular matrix coalgebra, for a serial coalgebra D whose Ext-quiver is a finite union of cycles, a finite dimensional coalgebra E and a finite dimensional bicomodule M .

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Section: Noetherian and Artinian Objectsmentioning

confidence: 99%

“…as left comodule). It also shows that a coalgebra can be left co-Noetherian but not right co-Noetherian, and left strictly quasi-finite but not right strictly quasi-finite (another example of right but not left strictly quasi-finite coalgebra is contained in [GNT,Example 2.7]). …”

Section: Noetherian and Artinian Objectsmentioning

confidence: 99%

Triangular matrix coalgebras and applications

Iovanov

2013

Linear and Multilinear Algebra

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“…By [7] C is left coFrobenius so in particular is a fqcF-coalgebra. By Proposition 2.6 C is a generator in C M. Now, we prove that C is not a generator in M C .…”

Section: ) Let C and D Be Two Morita-takeuchi Equivalent Coalgebrasmentioning

confidence: 99%

“…Theorem B [7] Let C be a coalgebra. With notation as before the following statements are equivalent A it follows that T i (C) has finite length and by [7,Corollary 2.11] it follows that C is left semiperfect.…”

Section: Theorem a [10] Let A Be A Grothendieck Category And U A Genementioning

confidence: 99%

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When is a Coalgebra a Generator?

Năstăsescu

Torrecillas

Oystaeyen

2007

Algebr Represent Theor

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Dedualizing Complexes of Bicomodules and MGM Duality Over Coalgebras

Positselski

2017

Algebr Represent Theor

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We present the definition of a dedualizing complex of bicomodules over a pair of cocoherent coassociative coalgebras C and D. Given such a complex B • , we construct an equivalence between the (bounded or unbounded) conventional, as well as absolute, derived categories of the abelian categories of left comodules over C and left contramodules over D. Furthermore, we spell out the definition of a dedualizing complex of bisemimodules over a pair of semialgebras, and construct the related equivalence between the conventional or absolute derived categories of the abelian categories of semimodules and semicontramodules. Artinian, co-Noetherian, and cocoherent coalgebras are discussed as a preliminary material.

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Localization in Coalgebras: Applications to Finiteness Conditions

Cited by 16 publications

References 12 publications

Triangular matrix coalgebras and applications

Triangular matrix coalgebras and applications

When is a Coalgebra a Generator?

Dedualizing Complexes of Bicomodules and MGM Duality Over Coalgebras

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