Your search keyword '"Sondre Kvamme"' showing total 8 results

1. $$d\mathbb {Z}$$-Cluster tilting subcategories of singularity categories

Author

Sondre Kvamme

Subjects

Combinatorics, Subcategory, Singularity, Exact category, General Mathematics, 010102 general mathematics, 0103 physical sciences, Cluster (physics), 010307 mathematical physics, 0101 mathematics, Algebra over a field, 01 natural sciences, Mathematics

Abstract

For an exact category $${{\mathcal {E}}}$$ E with enough projectives and with a $$d\mathbb {Z}$$ d Z -cluster tilting subcategory, we show that the singularity category of $${{\mathcal {E}}}$$ E admits a $$d\mathbb {Z}$$ d Z -cluster tilting subcategory. To do this we introduce cluster tilting subcategories of left triangulated categories, and we show that there is a correspondence between cluster tilting subcategories of $${{\mathcal {E}}}$$ E and $${\underline{{{\mathcal {E}}}}}$$ E ̲ . We also deduce that the Gorenstein projectives of $${{\mathcal {E}}}$$ E admit a $$d\mathbb {Z}$$ d Z -cluster tilting subcategory under some assumptions. Finally, we compute the $$d\mathbb {Z}$$ d Z -cluster tilting subcategory of the singularity category for a finite-dimensional algebra which is not Iwanaga–Gorenstein.

Published

2020

2. Higher Nakayama algebras I: Construction

Author

Gustavo Jasso, Chrysostomos Psaroudakis, Julian Külshammer, and Sondre Kvamme

Subjects

Pure mathematics, General Mathematics, Cluster-tilting, Auslander-Reiten quiver, Auslander-Reiten theory, 01 natural sciences, Homological embedding, Primary: 16G70, Secondary: 16G20, Mathematics::Category Theory, 0103 physical sciences, FOS: Mathematics, Mathematics - Combinatorics, Representation Theory (math.RT), 0101 mathematics, Algebra over a field, Mathematics::Representation Theory, Algebra och logik, Mathematics, Mathematics::Commutative Algebra, Mathematics::Rings and Algebras, 010102 general mathematics, Algebra and Logic, Statistics::Computation, Algebra, Nakayama algebras, Cellular algebra, Combinatorics (math.CO), 010307 mathematical physics, Mathematics - Representation Theory

Abstract

We introduce higher dimensional analogues of the Nakayama algebras from the viewpoint of Iyama's higher Auslander--Reiten theory. More precisely, for each Nakayama algebra $A$ and each positive integer $d$, we construct a finite dimensional algebra $A^{(d)}$ having a distinguished $d$-cluster-tilting $A^{(d)}$-module whose endomorphism algebra is a higher dimensional analogue of the Auslander algebra of $A$. We also construct higher dimensional analogues of the mesh category of type $\mathbb{ZA}_\infty$ and the tubes., Comment: v5: 50 pages, further minor corrections following referee report. With an appendix by the second named author and Chrysostomos Psaroudakis and an appendix by Sondre Kvamme

Published

2019

3. Axiomatizing subcategories of Abelian categories

Author

Sondre Kvamme

Subjects

Subcategory, Pure mathematics, Algebra and Number Theory, Homological algebra, Cluster tilting, Mathematics - Category Theory, Algebra and Logic, Abelian category, Mathematics::K-Theory and Homology, Mathematics::Category Theory, FOS: Mathematics, Category Theory (math.CT), Representation Theory (math.RT), Abelian group, Mathematics::Representation Theory, Mathematics - Representation Theory, Axiom, Algebra och logik, Mathematics

Abstract

We investigate how to characterize subcategories of abelian categories in terms of intrinsic axioms. In particular, we find intrinsic axioms which characterize generating cogenerating functorially finite subcategories, precluster tilting subcategories, and cluster tilting subcategories of abelian categories. As a consequence we prove that any $d$-abelian category is equivalent to a $d$-cluster tilting subcategory of an abelian category, without any assumption on the categories being projectively generated., Comment: 29 pages. Accepted for publication in Journal of Pure and Applied Algebra

Published

2022

4. GORENSTEIN PROJECTIVE OBJECTS IN FUNCTOR CATEGORIES

Author

Sondre Kvamme

Subjects

Subcategory, Functor, 010308 nuclear & particles physics, General Mathematics, 010102 general mathematics, Functor category, Commutative ring, 01 natural sciences, Combinatorics, Proj construction, Bounded function, 0103 physical sciences, Abelian category, 0101 mathematics, Mathematics

Abstract

Let $k$ be a commutative ring, let ${\mathcal{C}}$ be a small, $k$-linear, Hom-finite, locally bounded category, and let ${\mathcal{B}}$ be a $k$-linear abelian category. We construct a Frobenius exact subcategory ${\mathcal{G}}{\mathcal{P}}({\mathcal{G}}{\mathcal{P}}_{P}({\mathcal{B}}^{{\mathcal{C}}}))$ of the functor category ${\mathcal{B}}^{{\mathcal{C}}}$, and we show that it is a subcategory of the Gorenstein projective objects ${\mathcal{G}}{\mathcal{P}}({\mathcal{B}}^{{\mathcal{C}}})$ in ${\mathcal{B}}^{{\mathcal{C}}}$. Furthermore, we obtain criteria for when ${\mathcal{G}}{\mathcal{P}}({\mathcal{G}}{\mathcal{P}}_{P}({\mathcal{B}}^{{\mathcal{C}}}))={\mathcal{G}}{\mathcal{P}}({\mathcal{B}}^{{\mathcal{C}}})$. We show in examples that this can be used to compute ${\mathcal{G}}{\mathcal{P}}({\mathcal{B}}^{{\mathcal{C}}})$ explicitly.

Published

2018

5. An introduction to higher Auslander-Reiten theory

Author

Sondre Kvamme and Gustavo Jasso

Subjects

Pure mathematics, Morphism, Mathematics::Category Theory, General Mathematics, Mathematics::Rings and Algebras, 010102 general mathematics, Homological algebra, 0101 mathematics, Mathematics::Representation Theory, Mathematical proof, 01 natural sciences, Mathematics

Abstract

This article consists of an introduction to Iyama's higher Auslander-Reiten theory for Artin algebras from the viewpoint of higher homological algebra. We provide alternative proofs of the basic results in higher Auslander-Reiten theory, including the existence of $d$-almost-split sequences in $d$-cluster-tilting subcategories, following the approach to classical Auslander-Reiten theory due to Auslander, Reiten, and Smalo. We show that Krause's proof of Auslander's defect formula can be adapted to give a new proof of the defect formula for $d$-exact sequences. We use the defect formula to establish the existence of morphisms determined by objects in $d$-cluster-tilting subcategories.

Published

2018

6. A functorial approach to monomorphism categories for species I

Author

Julian Külshammer, Sondre Kvamme, Chrysostomos Psaroudakis, and Nan Gao

Subjects

13C14, 16G20, 16G70, 18A25, 18C20, Monomorphism, Pure mathematics, Applied Mathematics, General Mathematics, Mathematics::Rings and Algebras, Mathematics - Category Theory, Extension (predicate logic), Mathematics - Rings and Algebras, Monad (non-standard analysis), Rings and Algebras (math.RA), Bounded function, Mathematics::Category Theory, FOS: Mathematics, Category Theory (math.CT), Representation Theory (math.RT), Mathematics::Representation Theory, Mathematics - Representation Theory, Mathematics

Abstract

We introduce a very general extension of the monomorphism category as studied by Ringel and Schmidmeier which in particular covers generalised species over locally bounded quivers. We prove that analogues of the kernel and cokernel functor send almost split sequences over the path algebra and the preprojective algebra to split or almost split sequences in the monomorphism category. We derive this from a general result on preservation of almost split morphisms under adjoint functors whose counit is a monomorphism. Despite of its generality, our monomorphism categories still allow for explicit computations as in the case of Ringel and Schmidmeier., 53 pages

Published

2019

7. Co-Gorenstein algebras

Author

René Marczinzik and Sondre Kvamme

Subjects

Pure mathematics, General Computer Science, 0102 computer and information sciences, 01 natural sciences, Theoretical Computer Science, Mathematics::Algebraic Geometry, Mathematics::K-Theory and Homology, Mathematics::Category Theory, FOS: Mathematics, Representation Theory (math.RT), 0101 mathematics, Algebra over a field, Connection (algebraic framework), Mathematics::Representation Theory, Mathematics, Algebra and Number Theory, Conjecture, Mathematics::Commutative Algebra, 010102 general mathematics, Mathematics::Rings and Algebras, 16G10, 16E65, Mathematics - Rings and Algebras, Rings and Algebras (math.RA), 010201 computation theory & mathematics, Theory of computation, Mathematics - Representation Theory

Abstract

We review the theory of Co-Gorenstein algebras, which was introduced by Beligiannis in the article "The Homological Theory of Contravariantly Finite Subcategories: Gorenstein Categories, Auslander-Buchweitz Contexts and (Co-)Stabilization". We show a connection between Co-Gorenstein algebras and the Nakayama and Generalized Nakayama conjecture., 12 pages, Final version. Accepted for publication in Applied Categorical Structures

Published

2018

8. A generalization of the Nakayama functor

Author

Sondre Kvamme

Subjects

Pure mathematics, Generalization, General Mathematics, 0211 other engineering and technologies, 02 engineering and technology, Commutative ring, 01 natural sciences, Mathematics::Algebraic Topology, Mathematics::K-Theory and Homology, Mathematics::Category Theory, FOS: Mathematics, Category Theory (math.CT), Finitely-generated abelian group, 0101 mathematics, Representation Theory (math.RT), Mathematics, Functor, Mathematics::Commutative Algebra, 18E10, 16E65, 16D90, 010102 general mathematics, Mathematics::Rings and Algebras, Mathematics - Category Theory, 021107 urban & regional planning, Mathematics - Rings and Algebras, Adjunction, Rings and Algebras (math.RA), Homological algebra, Forgetful functor, Mathematics - Representation Theory, Vector space

Abstract

In this paper we introduce a generalization of the Nakayama functor for finite-dimensional algebras. This is obtained by abstracting its interaction with the forgetful functor to vector spaces. In particular, we characterize the Nakayama functor in terms of an ambidextrous adjunction of monads and comonads. In the second part we develop a theory of Gorenstein homological algebra for such Nakayama functor. We obtain analogues of several classical results for Iwanaga-Gorenstein algebras. One of our main examples is the module category $\Lambda\text{-}\operatorname{Mod}$ of a $k$-algebra $\Lambda$, where $k$ is a commutative ring and $\Lambda$ is finitely generated projective as a $k$-module., Comment: 39 pages, comments welcome

Published

2016