APPLICATION OF THE TRIANGULATED CATEGORY TO THE EXPLANATION OF FULLY-CHARM TETRAQUARK MASS

InterConf ◽

10.51582/interconf.19-20.02.2021.092 ◽

2021 ◽

pp. 934-939

Author(s):

Tetiana Obikhod

Keyword(s):

Theoretical Explanation ◽

Derived Categories ◽

Triangulated Category ◽

Mathematical Apparatus ◽

Broad Resonance ◽

Measured Mass

The discovery in July 2020 of fully-charm tetraquark led to the need for its theoretical explanation. For investigation of such complex four-quark formation, the modern mathematical apparatus of the theory of derived categories is used. By representing diquarks as solitonic objects in terms of sheaves, one can explain the measured mass of the broad resonance of fully-charm tetraquarks consisting of di-charmonia.

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Completing perfect complexes

Mathematische Zeitschrift ◽

10.1007/s00209-020-02490-z ◽

2020 ◽

Vol 296 (3-4) ◽

pp. 1387-1427 ◽

Cited By ~ 1

Author(s):

Henning Krause

Keyword(s):

Derived Categories ◽

Derived Category ◽

Triangulated Category ◽

Triangulated Categories ◽

Direct Construction ◽

Coherent Sheaves ◽

Perfect Complexes ◽

Coherent Ring ◽

Abelian Categories ◽

Finitely Presented

Abstract This note proposes a new method to complete a triangulated category, which is based on the notion of a Cauchy sequence. We apply this to categories of perfect complexes. It is shown that the bounded derived category of finitely presented modules over a right coherent ring is the completion of the category of perfect complexes. The result extends to non-affine noetherian schemes and gives rise to a direct construction of the singularity category. The parallel theory of completion for abelian categories is compatible with the completion of derived categories. There are three appendices. The first one by Tobias Barthel discusses the completion of perfect complexes for ring spectra. The second one by Tobias Barthel and Henning Krause refines for a separated noetherian scheme the description of the bounded derived category of coherent sheaves as a completion. The final appendix by Bernhard Keller introduces the concept of a morphic enhancement for triangulated categories and provides a foundation for completing a triangulated category.

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On the abelianization of derived categories and a negative solution to Rosický’s problem

Compositio Mathematica ◽

10.1112/s0010437x12000413 ◽

2012 ◽

Vol 149 (1) ◽

pp. 125-147 ◽

Cited By ~ 2

Author(s):

Silvana Bazzoni ◽

Jan Šťovíček

Keyword(s):

Regular Cardinal ◽

Large Family ◽

Global Dimension ◽

Derived Categories ◽

Triangulated Category ◽

Triangulated Categories ◽

Negative Solution ◽

Compactly Generated

AbstractWe prove for a large family of rings R that their λ-pure global dimension is greater than one for each infinite regular cardinal λ. This answers in the negative a problem posed by Rosický. The derived categories of such rings then do not satisfy, for any λ, the Adams λ-representability for morphisms. Equivalently, they are examples of well-generated triangulated categories whose λ-abelianization in the sense of Neeman is not a full functor for any λ. In particular, we show that given a compactly generated triangulated category, one may not be able to find a Rosický functor among the λ-abelianization functors.

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Rank functions on triangulated categories

Journal für die reine und angewandte Mathematik (Crelles Journal) ◽

10.1515/crelle-2021-0052 ◽

2021 ◽

Vol 0 (0) ◽

Author(s):

Joseph Chuang ◽

Andrey Lazarev

Keyword(s):

Derived Categories ◽

Derived Category ◽

Rank Function ◽

Triangulated Category ◽

Triangulated Categories ◽

Graded Algebras ◽

Artinian Rings ◽

Differential Graded Algebras ◽

Skew Fields ◽

Rank Functions

Abstract We introduce the notion of a rank function on a triangulated category 𝒞 {\mathcal{C}} which generalizes the Sylvester rank function in the case when 𝒞 = 𝖯𝖾𝗋𝖿 ⁢ ( A ) {\mathcal{C}=\mathsf{Perf}(A)} is the perfect derived category of a ring A. We show that rank functions are closely related to functors into simple triangulated categories and classify Verdier quotients into simple triangulated categories in terms of particular rank functions called localizing. If 𝒞 = 𝖯𝖾𝗋𝖿 ⁢ ( A ) {\mathcal{C}=\mathsf{Perf}(A)} as above, localizing rank functions also classify finite homological epimorphisms from A into differential graded skew-fields or, more generally, differential graded Artinian rings. To establish these results, we develop the theory of derived localization of differential graded algebras at thick subcategories of their perfect derived categories. This is a far-reaching generalization of Cohn’s matrix localization of rings and has independent interest.

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DEGENERATION-LIKE ORDERS IN TRIANGULATED CATEGORIES

Journal of Algebra and Its Applications ◽

10.1142/s021949880500137x ◽

2005 ◽

Vol 04 (05) ◽

pp. 587-597 ◽

Cited By ~ 7

Author(s):

BERNT TORE JENSEN ◽

XIUPING SU ◽

ALEXANDER ZIMMERMANN

Keyword(s):

Partial Order ◽

Natural Generalization ◽

Derived Categories ◽

Derived Category ◽

Closed Field ◽

Triangulated Category ◽

Triangulated Categories ◽

Finite Dimensional Algebra ◽

Dimensional Algebra ◽

Finite Dimensional

In an earlier paper we defined a relation ≤Δ between objects of the derived category of bounded complexes of modules over a finite dimensional algebra over an algebraically closed field. This relation was shown to be equivalent to the topologically defined degeneration order in a certain space [Formula: see text] for derived categories. This space was defined as a natural generalization of varieties for modules. We remark that this relation ≤Δ is defined for any triangulated category and show that under some finiteness assumptions on the triangulated category ≤Δ is always a partial order.

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A theoretical explanation of “concomitant resistance”

Bulletin of Mathematical Biology ◽

10.1016/s0092-8240(05)80771-2 ◽

1995 ◽

Vol 57 (4) ◽

pp. 733-747

Author(s):

S MICHELSON ◽

J LEITH

Keyword(s):

Theoretical Explanation ◽

Concomitant Resistance

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MATHEMATICAL APPARATUS FOR CALCULATIMG THE MICROSTRUCTURE OF A HARMONIC KINOFORM LENS

Автометрия ◽

10.15372/aut20190101 ◽

2019 ◽

Keyword(s):

Mathematical Apparatus

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Increasing Cases of Prison Break in Nigeria: A Theoretical Explanation

International Journal of Scientific and Research Publications (IJSRP) ◽

10.29322/ijsrp.9.10.2019.p9413 ◽

2019 ◽

Vol 9 (10) ◽

pp. p9413

Author(s):

Onah Oliver Onyekaneze ◽

Adenyi Okechukwu Theophilus ◽

Eneh Maximus Ikenna

Keyword(s):

Theoretical Explanation

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GEOMETRIC THEORY OF MULTIDIMENSIONAL INTERPOLATION

Automation and modeling in design and management of ◽

10.30987/2658-6436-2020-1-9-16 ◽

2020 ◽

Vol 2020 (1) ◽

pp. 9-16

Author(s):

Evgeniy Konopatskiy

Keyword(s):

Response Function ◽

Algebraic Curves ◽

Geometric Theory ◽

Analytical Description ◽

Geometric Interpretation ◽

Affine Geometry ◽

Mathematical Apparatus ◽

Multidimensional Interpolation ◽

Pass Through

The paper presents a geometric theory of multidimensional interpolation based on invariants of affine geometry. The analytical description of geometric interpolants is performed within the framework of the mathematical apparatus BN-calculation using algebraic curves that pass through preset points. A geometric interpretation of the interaction of parameters, factors, and the response function is presented, which makes it possible to generalize the geometric theory of multidimensional interpolation in the direction of increasing the dimension of space. The conceptual principles of forming the tree of the geometric interpolant model as a geometric basis for modeling multi-factor processes and phenomena are described.

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