Your search keyword '"Reflective subcategory"' showing total 180 results

1. Partial actions of groups on profinite spaces

Author

Luis Martínez, Héctor Pinedo, and Andrés Villamizar

Subjects

partial action, profinite space, orbit equivalence relation, clopen sets, globalization, continuous section, reflective subcategory, enveloping action, Mathematics, QA1-939, Analysis, QA299.6-433

Abstract

We show that for a partial action η with closed domain of a compact group G on a profinite space X the space of orbits X/~G is profinite, this leads to the fact that when G is profinite the enveloping space XG is also profinite. Moreover, we provide conditions for the induced quotient map πG : X → X / ∼G of η to have a continuous section. Relations between continuous sections of πG and continuous sections of the quotient map induced by the enveloping action of η are also considered. At the end of this work, we prove that the category of actions on profinite spaces with countable number of clopen sets is reflective in the category of actions of compact Hausdorff spaces having countable number of clopen sets.

Published

2024

2. Solution to two problems on ideally conjunctive join-semilattices.

Author

Shen, Ao and Li, Qingguo

Subjects

*SEMILATTICES, *PARTIALLY ordered sets, *HOMOMORPHISMS, *PROBLEM solving

Abstract

In this paper, we solve two problems concerning the ideally conjunctive join-semilattices. First, we show that L / R 1 (Id L) | L is ideally conjunctive for all join-semilattices L. Then we characterize those ideally conjunctive join-semilattices L such that coz a is compact for all a ∈ L. Moreover, we give the definition of conjunctive posets and prove that the category of ideally conjunctive join-semilattices and join homomorphisms is reflective in the category of conjunctive posets and weakly ideal-continuous maps. As a corollary, we obtain the free ideally conjunctive join-semilattices over conjunctive posets. [ABSTRACT FROM AUTHOR]

Published

2024

3. Partial actions of groups on profinite spaces.

Author

MARTíNEZ, LUIS, PINEDO, HÉCTOR, and VILIAMIZAR, ANDRÉS

Subjects

PROFINITE groups, HAUSDORFF spaces, COMMERCIAL space ventures, COMPACT groups, COMPACT spaces (Topology)

Abstract

We show that for a nice partial action n with closed domain of a compact group G on a profinite space X the orbit space X/ ~G is profinite, this leads to the fact that when G is profinite the enveloping space XG is also profinite. Moreover, we provide conditions for the induced quotient map πG: X → ~G of η to have a continuous section. Relations between continuous sections of πG and continuous sections of the quotient map induced by the enveloping action of η are also considered. At the end of this work, we prove that the category of separately continuous actions on profinite spaces is reflective in the category of separately continuous actions on compact Hausdorff spaces. [ABSTRACT FROM AUTHOR]

Published

2024

4. On the Categories of Weak and Strong LM-G-Filter Spaces

Author

Merin Jose and Sunil C. Mathew

Subjects

Weak r-level LM-G-filter spaces, strong p-level LM-G-filter spaces, initial structures, fibre smallness, reflective subcategory, coreflective subcategory, Engineering (General). Civil engineering (General), TA1-2040, Mathematics, QA1-939

Abstract

In this paper, the authors introduce the notion of weak r-level LM-G-filter spaces and strong p-level LM-G-filter spaces and discuss certain properties of these spaces. The study identifies [Formula: see text]-G, the category of weak r-level LM-G-filter spaces as an isomorphism-closed bireflective full subcategory of LM-G, the category of LM-G-filter spaces. It is also proved that [Formula: see text]-G, the category of strong p-level LM-G-filter spaces is an isomorphism-closed bicoreflective full subcategory of LM-G. Moreover, level decompositions of LM-G-filter spaces are studied and some properties of the associated L-pre G-filter spaces are obtained.

Published

2022

5. SOME REMARKS ON NEUTROSOPHIC T0-SPACES.

Author

LAZAAR, SAMI, MHEMDI, ABDELWAHEB, and OKBANI, HADJER

Subjects

*TOPOLOGICAL spaces, *AXIOMS

Abstract

This paper is devoted to the study of the T0 separation axiom for a neutrosophic topological space. We give a categorical study of these spaces in a special case of neutrosophic topological spaces called neutrosophic saturated topological spaces. [ABSTRACT FROM AUTHOR]

Published

2023

6. Reflections on Termination of Linear Loops

Author

Zhu, Shaowei, Kincaid, Zachary, Goos, Gerhard, Founding Editor, Hartmanis, Juris, Founding Editor, Bertino, Elisa, Editorial Board Member, Gao, Wen, Editorial Board Member, Steffen, Bernhard, Editorial Board Member, Woeginger, Gerhard, Editorial Board Member, Yung, Moti, Editorial Board Member, Silva, Alexandra, editor, and Leino, K. Rustan M., editor

Published

2021

7. Catalyzed LM-G-filter spaces.

Author

Jose, Merin and Mathew, Sunil C.

Subjects

*AUTHORS

Abstract

In this paper, the authors introduce catalyzed LM-G-filter spaces, a special case of weakly inspired LM-G-filter spaces and identify certain properties of these spaces. It is proved that CLM-G, the category of catalyzed LM-G-filter spaces, is isomorphic to ILM-G, the category of inspired LM-G-filter spaces. Moreover, the categorical connection between WILM-G, the category of weakly inspired LM-G-filter spaces, and CLM-G is investigated through interior and exterior catalyzation of weakly inspired LM-G-filter spaces. It is proved that CLM-G is an isomorphism-closed, bireflective and bicoreflective full subcategory of WILM-G and LM-G. [ABSTRACT FROM AUTHOR]

Published

2022

8. On the Categories of Weak and Strong LM-G-Filter Spaces.

Author

Jose, Merin and Mathew, Sunil C.

Subjects

FIBERS, AUTHORS

Abstract

In this paper, the authors introduce the notion of weak r-level LM-G-filter spaces and strong p-level LM-G-filter spaces and discuss certain properties of these spaces. The study identifies W L M r -G, the category of weak r-level LM-G-filter spaces as an isomorphism-closed bireflective full subcategory of LM-G, the category of LM-G-filter spaces. It is also proved that S L M p -G, the category of strong p-level LM-G-filter spaces is an isomorphism-closed bicoreflective full subcategory of LM-G. Moreover, level decompositions of LM-G-filter spaces are studied and some properties of the associated L-pre G-filter spaces are obtained. [ABSTRACT FROM AUTHOR]

Published

2022

9. Solutions to two open problems in topological residuated lattices.

Author

He, Pengfei, Yang, Jiang, and Wang, Juntao

Subjects

*RESIDUATED lattices, *TOPOLOGY

Abstract

The main aim of this paper is to solve two open problems in topological residuated lattices. In this paper, given a linear topological residuated lattice, we find sufficient and necessary conditions under which the original topology coincides with the new one induced by a system of filters of the residuated lattice. This result will be valid for finite and infinite BL -algebras, which is a complete answer to the open problem proposed by Zahiri and Borzooei in 2016 and improves the incomplete answer given by Yang et al. in 2018. Moreover, using the topology induced by a system of filters of a residuated lattice, we prove that the set of all filters of the residuated lattice and the set of all corresponding zero-dimensional linear topological residuated lattices have the same cardinality. This result gives a negative answer to the open problem proposed by Yang and Zhang in 2019. Finally, we show that the category of residuated lattices is the reflective subcategory of the category of linear topological residuated lattices. [ABSTRACT FROM AUTHOR]

Published

2021

10. Fuzzy closure operators and their applications.

Author

Han, S. W. and Wang, R. R.

Subjects

*PARTIALLY ordered sets

Abstract

Fuzzy closure operators play a significant role in fuzzy order theory. This paper aims to further enrich and improve the study of fuzzy closure operators. Based on the work of Bělohlávek and Yao, we shall continue to study the relative properties of fuzzy closure operators. First, we shall consider the extensions of L-subsets via fuzzy closure operators. Then we give an application of fuzzy closure operators, that is, by fuzzy closure operators we shall prove that the category CFPos of complete fuzzy posets and their fuzzy-join preserving maps is a reflective full subcategory of FPost, where FPost denotes the category of fuzzy posets and their fuzzy-existing-join preserving maps. [ABSTRACT FROM AUTHOR]

Published

2021

11. Structure Theory of Regular Semigroups Using Categories

Author

Rajan, A. R., Rizvi, Syed Tariq, editor, Ali, Asma, editor, and Filippis, Vincenzo De, editor

Published

2016

12. Some remarks on neutrosophic T0 -spaces

Author

Lazaar, Sami, Mhemdi, Abdelwaheb, Okbani, Hadjer, Lazaar, Sami, Mhemdi, Abdelwaheb, and Okbani, Hadjer

Abstract

This paper is devoted to the study of the T0 separation axiom for a neutrosophic topological space. We give a categorical study of these spaces in a special case of neutrosophic topological spaces called neutrosophic saturated topological spaces.

Published

2023

13. Some remarks on neutrosophic T0 -spaces

Abstract

This paper is devoted to the study of the T0 separation axiom for a neutrosophic topological space. We give a categorical study of these spaces in a special case of neutrosophic topological spaces called neutrosophic saturated topological spaces.

Published

2023

14. Concerning P-Sublocales and Disconnectivity.

Author

Dube, Themba

Abstract

Motivated by certain types of ideals in pointfree functions rings, we define what we call P-sublocales in completely regular frames. They are the closed sublocales that are interior to the zero-sublocales containing them. We call an element of a frame L that induces a P-sublocale a P-element, and denote by Pel (L) the set of all such elements. We show that if L is basically disconnected, then Pel (L) is a frame and, in fact, a dense sublocale of L. Ordered by inclusion, the set S p (L) of P-sublocales of L is a complete lattice, and, for basically disconnected L, S p (L) is a frame if and only if Pel (L) is the smallest dense sublocale of L. Furthermore, for basically disconnected L, S p (L) is a sublocale of the frame S c (L) consisting of joins of closed sublocales of L if and only if L is Boolean. For extremally disconnected L, iterating through the ordinals (taking intersections at limit ordinals) yields an ordinal sequence L ⊇ Pel (L) ⊇ Pel 2 (L) ⊇ ⋯ ⊇ Pel α (L) ⊇ Pel α + 1 (L) ⊇ ⋯ that stabilizes at an extremally disconnected P-frame, that we denote by Pel ∞ (L) . It turns out that Pel ∞ (L) is the reflection to L from extremally disconnected P-frames when morphisms are suitably restricted. [ABSTRACT FROM AUTHOR]

Published

2019

15. A category of complete residuated lattice-value neighborhood groups

Author

Lingqiang Li and Qiu Jin

Subjects

Logic, Group (mathematics), Structure (category theory), Space (mathematics), Lattice (discrete subgroup), Topological category, Combinatorics, Artificial Intelligence, Mathematics::Category Theory, Astrophysics::Earth and Planetary Astrophysics, Residuated lattice, Uniformization (set theory), Reflective subcategory, Mathematics

Abstract

In this paper, considering L a complete residuated lattice, we present a lattice-valued category TNG (resp., TTNG) of (topological) ⊤-neighborhood groups, where the object is defined as a group equipped with a (topological) ⊤-neighborhood space such that the group operations are continuous with respect to the (topological) ⊤-neighborhood space. It is proved that: (1) The ⊤-neighborhood space associated with a ⊤-neighborhood group is topological, so the category TNG is equivalent to the category TTNG. Hence TTNG is redundant, and we need only discuss TNG. (2) The category TNG has nice characterizations, localization and uniformization. (3) The category TNG has initial structure, so it is a topological category, and each initial structure has an ordered representation. (4) The category NG of neighborhood groups can be embedded in TNG as a reflective subcategory. (5) The category TNG can be embedded in the category SLNG of stratified L-neighborhood groups as a reflective subcategory when the underlying lattice L is a meet-continuous lattice. (6) The category TNG is equivalent to the category StrLTOPG of strong L-topological groups when L is a complete MV-algebra.

Published

2022

16. On bounded residuated ℓEQ-algebras

Author

Yichuan Yang and Wei Luan

Subjects

0209 industrial biotechnology, Pure mathematics, Subvariety, Logic, 02 engineering and technology, 020901 industrial engineering & automation, Artificial Intelligence, Binary operation, Bounded function, 0202 electrical engineering, electronic engineering, information engineering, Closure operator, 020201 artificial intelligence & image processing, Filter (mathematics), Element (category theory), Partially ordered set, Reflective subcategory, Mathematics

Abstract

An EQ-algebra has three basic binary operations (meet, multiplication and a fuzzy equality) and a top element. An lEQ-algebra is a lattice-ordered EQ-algebra satisfying the substitution property of the join operation. In this article, we study bounded residuated lEQ-algebras (BR-lEQ-algebras for short). We introduce a subvariety RL-EQ-algebras of BR-lEQ-algebras, and prove that the categories of RL-EQ-algebras and residuated lattices are categorical isomorphic. We also prove that RL-EQ-algebras are precisely the BR-lEQ-algebras that can be reconstructed from residuated lattices. We further show the existence of a closure operator on the poset of all BR-lEQ-algebras with the same lattice and multiplication reduct, the existence of the maximum element in the poset. Then we introduce filters in BR-lEQ-algebras and give a lattice isomorphism between the filter lattice and the congruence lattice. Finally, we prove that the category of residuated lattices is isomorphic to a reflective subcategory of BR-lEQ-algebras.

Published

2022

17. On the spectralization of affine and perfectly normal spaces.

Author

Golasiński, Marek and Bilski, Paweł

Subjects

*AFFINE algebraic groups, *TOPOLOGICAL spaces, *CONTINUOUS functions, *HOMEOMORPHISMS, *SUBSPACES (Mathematics)

Abstract

We show that for a field K and n ≥ 1 {n\geq 1} , the soberification 𝒮 ⁢ (𝔸 n ⁢ (K)) {\mathcal{S}(\mathbb{A}^{n}(K))} of the affine n-space 𝔸 n ⁢ (K) {\mathbb{A}^{n}(K)} over K is homeomorphic to its spectralization ℬ ⁢ 𝒮 ⁢ (𝔸 n ⁢ (K)) {\mathcal{BS}(\mathbb{A}^{n}(K))} , and it can be embedded into the spectrum Spec ⁢ (K ⁢ [ X 1 , ... , X n ]) {\mathrm{Spec}(K[X_{1},\dots,X_{n}])}. Moreover, if the field K is algebraically closed, then there are homeomorphisms 𝒮 ⁢ (𝔸 n ⁢ (K)) ≈ ℬ ⁢ 𝒮 ⁢ (𝔸 n ⁢ (K)) ≈ Spec ⁢ (K ⁢ [ X 1 , ... , X n ]) \mathcal{S}(\mathbb{A}^{n}(K))\approx\mathcal{BS}(\mathbb{A}^{n}(K))\approx% \mathrm{Spec}(K[X_{1},\dots,X_{n}]). We also show that for a space X, the subspace z ⁢ Spec ⁢ (C ⁢ (X)) ⊆ Spec ⁢ (C ⁢ (X)) z\mathrm{Spec}(C(X))\subseteq\mathrm{Spec}(C(X)) of prime z-ideals of the ring C ⁢ (X) {C(X)} of real-valued continuous functions on X is homeomorphic to the space z ⁢ 𝒮 ⁢ ℛ ⁢ (X) {z\mathcal{SR}(X)} of prime z-filters with an appropriate topology and there is a homeomorphism ℬ ⁢ 𝒮 ⁢ (X) ≈ z ⁢ Spec ⁢ (C ⁢ (X)) {\mathcal{BS}(X)\approx z\mathrm{Spec}(C(X))} provided X is perfectly normal. [ABSTRACT FROM AUTHOR]

Published

2018

18. Stratified L-prefilter convergence structures in stratified L-topological spaces.

Author

Pang, Bin and Xiu, Zhen-Yu

Subjects

*STOCHASTIC convergence, *LATTICE theory, *TOPOLOGICAL spaces, *MATHEMATICAL category theory, *FUZZY logic

Abstract

In this paper, a new approach to fuzzy convergence theory in the framework of stratified L-topological spaces is provided. Firstly, the concept of stratified L-prefilter convergence structures is introduced and it is shown that the resulting category is a Cartesian closed topological category. Secondly, the relations between the category of stratified L-prefilter convergence spaces and the category of stratified L-topological spaces are studied and it is proved that the latter can be embedded in the former as a reflective subcategory. Finally, the relations between the category of stratified L-prefilter convergence spaces and the category of stratified L-Min convergence spaces (fuzzy convergence spaces in the sense of Min) are investigated and it is shown that the former can be embedded in the latter as a reflective subcategory. [ABSTRACT FROM AUTHOR]

Published

2018

19. Some notes on connectedness in nearness frames.

Author

Baboolal, D. and Mugochi, M.M.

Subjects

*MATHEMATICAL connectedness, *GRAPH connectivity, *NEARNESS spaces, *TOPOLOGY, *FRAMES (Vector analysis)

Abstract

We study the uniform connection properties of uniform local connectedness, a weaker variant of the latter, and a certain property S in the context of nearness frames. We show that the uniformly locally connected nearness frames form a reflective subcategory of the category of nearness frames whose underlying frame is locally connected. Amongst other results we show that these uniform connection properties are conserved and reflected by perfect nearness extensions which are uniformly regular. [ABSTRACT FROM AUTHOR]

Published

2018

20. 模糊 Z-Quantale 范畴的反射子范畴.

Author

邬宏伟 and 汪开云

Abstract

Copyright of Journal of Jilin University (Science Edition) / Jilin Daxue Xuebao (Lixue Ban) is the property of Zhongguo Xue shu qi Kan (Guang Pan Ban) Dian zi Za zhi She and its content may not be copied or emailed to multiple sites or posted to a listserv without the copyright holder's express written permission. However, users may print, download, or email articles for individual use. This abstract may be abridged. No warranty is given about the accuracy of the copy. Users should refer to the original published version of the material for the full abstract. (Copyright applies to all Abstracts.)

Published

2018

21. MODAL OPERATORS ON RINGS OF CONTINUOUS FUNCTIONS

Author

Luca Carai, Patrick J. Morandi, and Guram Bezhanishvili

Subjects

Pure mathematics, Ring (mathematics), Logic, Duality (mathematics), General Topology (math.GN), Hausdorff space, Mathematics::General Topology, Modal logic, Mathematics - Logic, Modal operator, Stone duality, Philosophy, 03B45, 54C30, 06F25, 06E25, 06E15, Mathematics::Category Theory, Bounded function, FOS: Mathematics, Logic (math.LO), Reflective subcategory, Mathematics - General Topology, Mathematics

Abstract

It is a classic result in modal logic, often referred to as Jónsson-Tarski duality, that the category of modal algebras is dually equivalent to the category of descriptive frames. The latter are Kripke frames equipped with a Stone topology such that the binary relation is continuous. This duality generalizes the celebrated Stone duality for boolean algebras. Our goal is to generalize descriptive frames so that the topology is an arbitrary compact Hausdorff topology. For this, instead of working with the boolean algebra of clopen subsets of a Stone space, we work with the ring of continuous real-valued functions on a compact Hausdorff space. The main novelty is to define a modal operator on such a ring utilizing a continuous relation on a compact Hausdorff space.Our starting point is the well-known Gelfand duality between the category ${\sf KHaus}$ of compact Hausdorff spaces and the category $\boldsymbol {\mathit {uba}\ell }$ of uniformly complete bounded archimedean $\ell $ -algebras. We endow a bounded archimedean $\ell $ -algebra with a modal operator, which results in the category $\boldsymbol {\mathit {mba}\ell }$ of modal bounded archimedean $\ell $ -algebras. Our main result establishes a dual adjunction between $\boldsymbol {\mathit {mba}\ell }$ and the category ${\sf KHF}$ of what we call compact Hausdorff frames; that is, Kripke frames equipped with a compact Hausdorff topology such that the binary relation is continuous. This dual adjunction restricts to a dual equivalence between ${\sf KHF}$ and the reflective subcategory $\boldsymbol {\mathit {muba}\ell }$ of $\boldsymbol {\mathit {mba}\ell }$ consisting of uniformly complete objects of $\boldsymbol {\mathit {mba}\ell }$ . This generalizes both Gelfand duality and Jónsson-Tarski duality.

Published

2021

22. On the category of profinite spaces as a reflective subcategory

Author

Abolfazl Tarizadeh

Subjects

profinite spaces, connected components, coarser topology, reflective subcategory, Mathematics, QA1-939, Analysis, QA299.6-433

Abstract

In this paper by using the ring of real-valued continuous functions $C(X)$, we prove a theorem in profinite spaces which states that for a compact Hausdorff space $X$, the set of its connected components $X/_{\sim}$ endowed with the quotient topology is a profinite space. Then we apply this result to give an alternative proof to the fact that the category of profinite spaces is a reflective subcategory in the category of compact Hausdorff spaces. Finally, under some circumstances on a space $X$, we compute the connected components of the space $t(X)$ in terms of the ones of the space $X$.

Published

2013

23. Hull operators and interval operators in (L,M)-fuzzy convex spaces

Author

Bin Pang

Subjects

0209 industrial biotechnology, Mathematics::General Mathematics, Logic, Regular polygon, 02 engineering and technology, Arity, Lattice (discrete subgroup), Fuzzy logic, Combinatorics, 020901 industrial engineering & automation, Distributive property, Artificial Intelligence, 0202 electrical engineering, electronic engineering, information engineering, Interval (graph theory), 020201 artificial intelligence & image processing, Reflective subcategory, De Morgan algebra, Mathematics

Abstract

Considering L being a continuous lattice and M being a completely distributive De Morgan algebra, several basic notions with respect to ( L , M ) -fuzzy convex structures in the sense of Shi and Xiu are introduced and their relationship with ( L , M ) -fuzzy convex structures are studied. Firstly, an equivalent form of ( L , M ) -fuzzy convex structures in the sense of Shi and Xiu is provided. Secondly, two types of fuzzy hull operators are introduced, which are called ( L , M ) -fuzzy hull operators and ( L , M ) -fuzzy restricted hull operators, respectively. It is shown that they can be used to characterize ( L , M ) -fuzzy convex structures. Finally, fuzzy counterparts of interval operators in the ( L , M ) -fuzzy case are proposed, which are called ( L , M ) -fuzzy interval operators. It is proved that there is a Galois correspondence between the category of ( L , M ) -fuzzy interval spaces and that of ( L , M ) -fuzzy convex spaces and further the category of arity 2 ( L , M ) -fuzzy convex spaces can be embedded in the category of ( L , M ) -fuzzy interval spaces as a fully reflective subcategory.

Published

2021

24. Extensional L-fuzzy Q-convergence structures.

Author

Xiao-Yan Gao, Bin Pang, and Xiao-Fei Yang

Subjects

*STOCHASTIC convergence, *TOPOLOGICAL spaces, *FUZZY logic, *EMBEDDINGS (Mathematics), *MATHEMATICAL category theory

Abstract

In this paper, the concept of extensional L-fuzzy Q-convergence structures is proposed. It is shown that there is an adjunction between the category of extensional L-fuzzy topological spaces and the category of extensional L-fuzzy topological spaces. In particular, the category of extensional L-fuzzy topological spaces can be embedded in the category of extensional L-fuzzy Q-convergence spaces as a reflective subcategory. Also, the notion of topological extensional L-fuzzy Q-convergence spaces is introduced and the resulting category is shown to be isomorphic to the category of extensional L-fuzzy topological spaces. [ABSTRACT FROM AUTHOR]

Published

2016

25. Categorical foundations of variety-based bornology.

Author

Paseka, Jan and Solovyov, Sergey A.

Subjects

*ISOMORPHISM (Mathematics), *SET theory, *BORNOLOGICAL spaces, *MATHEMATICAL analysis, *LATTICE field theory

Abstract

Following the concept of topological theory of S.E. Rodabaugh, this paper introduces a new approach to (lattice-valued) bornology, which is based in bornological theories, and which is called variety-based bornology. In particular, motivated by the notion of topological system of S. Vickers, we introduce the concept of variety-based bornological system, and show that the category of variety-based bornological spaces is isomorphic to a full reflective subcategory of the category of variety-based bornological systems. [ABSTRACT FROM AUTHOR]

Published

2016

26. Fuzzy cut-stable map and its extension property.

Author

Nana Ma and Bin Zhao

Subjects

*FUZZY control systems, *LATTICE dynamics, *LATTICE field theory, *HOMOMORPHISMS, *MATHEMATICAL functions

Abstract

In this paper, based on a complete residuated lattice, we introduce the concept of fuzzy cut-stable maps and discuss the relationship between fuzzy cut-stable maps and some special maps. We also obtain the extension property of fuzzy cut-stable maps. Furthermore, it is proved that the category of fuzzy complete (continuous) lattices with fuzzy complete homomorphisms is a full reflective subcategory of the category of fuzzy (precontinuous) posets with fuzzy cut-stable maps. [ABSTRACT FROM AUTHOR]

Published

2016

27. ON REFLECTIVE SUBCATEGORIES OF LOCALLY PRESENTABLE CATEGORIES.

Author

ADÁMEK, J. and ROSICKÝ, J.

Subjects

*MATHEMATICAL category theory, *ISOMORPHISM (Mathematics), *LIMITS (Mathematics), *LIMIT theorems, *MONOTONE operators

Abstract

Are all subcategories of locally finitely presentable categories that are closed under limits and ƛ-filtered colimits also locally presentable? For full subcategories the answer is affirmative. Makkai and Pitts proved that in the case ƛ = ... the answer is affirmative also for all iso-full subcategories, i. e., those containing with every pair of objects all isomorphisms between them. We discuss a possible generalization of this from ... to an arbitrary ƛ. [ABSTRACT FROM AUTHOR]

Published

2015

28. SKEW-MONOIDAL REFLECTION AND LIFTING THEOREMS.

Author

LACK, STEPHEN and STREET, ROSS

Subjects

*MATHEMATICS theorems, *BLOWING up (Algebraic geometry), *EILENBERG-Moore spectral sequences, *FUNCTION algebras, *SKEWNESS (Probability theory)

Abstract

This paper extends the Day Reflection Theorem to skew monoidal categories. We also provide conditions under which a skew monoidal structure can be lifted to the category of Eilenberg-Moore algebras for a comonad. [ABSTRACT FROM AUTHOR]

Published

2015

29. Definable orthogonality classes in accessible categories are small.

Author

Bagaria, Joan, Casacuberta, Carles, Mathias, A. R. D., and Rosický, Jiří

Subjects

*HOMOTOPY theory, *MATHEMATIC morphism, *EXISTENCE theorems, *COHOMOLOGY theory, *LEVY processes

Abstract

We lower substantially the strength of the assumptions needed for the validity of certain results in category theory and homotopy theory which were known to follow from Vopenka's principle. We prove that the necessary large-cardinal hypotheses depend on the complexity of the formulas defining the given classes, in the sense of the L'evy hierarchy. For example, the statement that, for a class S of morphisms in a locally presentable category C of structures, the orthogonal class of objects is a small-orthogonality class (hence reflective) can be proved in ZFC if S is 61, while it follows from the existence of a proper class of supercompact cardinals if S is 62, and from the existence of a proper class of what we call C.n/-extendible cardinals if S is 6nC2 for n = 1. These cardinals form a new hierarchy, and we show that Vopenka's principle is equivalent to the existence of C.n/-extendible cardinals for all n. As a consequence of our approach, we prove that the existence of cohomological localizations of simplicial sets, a long-standing open problem in algebraic topology, is implied by the existence of arbitrarily large supercompact cardinals. This follows from the fact that E'-equivalence classes are 62, where E denotes a spectrum treated as a parameter. In contrast with this fact, E'-equivalence classes are 61, from which it follows (as is well known) that the existence of homological localizations is provable in ZFC. [ABSTRACT FROM AUTHOR]

Published

2015

30. Lattice-valued bornological systems.

Author

Paseka, Jan, Solovyov, Sergey A., and Stehlík, Milan

Subjects

*LATTICE theory, *BORNOLOGICAL spaces, *TOPOLOGICAL spaces, *GENERALIZATION, *POINT set theory

Abstract

Motivated by the concept of lattice-valued topological system of J.T. Denniston, A. Melton, and S.E. Rodabaugh, which extends lattice-valued topological spaces, this paper introduces the notion of lattice-valued bornological system as a generalization of lattice-valued bornological spaces of M. Abel and A. Šostak. We aim at (and make the first steps towards) the theory, which will provide a common setting for both lattice-valued point-set and point-free bornology. In particular, we show the algebraic structure of the latter. [ABSTRACT FROM AUTHOR]

Published

2015

31. Left determined model categories.

Author

Gaucher, Philippe

Subjects

*MATHEMATICAL category theory, *MATHEMATICAL logic, *STRUCTURAL frame models, *MODEL theory, *REPRESENTATIONS of categories

Abstract

Several methods for constructing left determined model structures are expounded. The starting point is Olschok's work on locally presentable categories. We give sufficient conditions to obtain left determined model structures on a full reflective subcategory, on a full coreflective subcategory and on a comma category. An application is given by constructing a left determined model structure on star-shaped weak transition systems. [ABSTRACT FROM AUTHOR]

Published

2015

32. Higher Central Extensions in Mal'tsev Categories.

Author

Everaert, Tomas

Abstract

Higher dimensional central extensions of groups were introduced by G. Janelidze as particular instances of the abstract notion of covering morphism from categorical Galois theory. More recently, the notion has been extended to and studied in arbitrary semi-abelian categories. Here, we further extend the scope to exact Mal'tsev categories and beyond. For this, we consider conditions on a Galois structure Γ = (ℂ, 핏, I, H, η, ℰ) which insure the existence of an induced Galois structure Γ = (ℂ, 핏, I, H, η, ℰ) such that ℂ and 핏 are full subcategories of the arrow category (ℂ) consisting, respectively, of all morphisms in the class ℰ, and of all covering morphisms with respect to Γ. Moreover, we prove that Γ satisfies the same conditions as Γ, so that, inductively, we obtain, for each n ≥ 1, a Galois structure Γ = ( Γ), whose coverings we call n + 1-fold central extensions. [ABSTRACT FROM AUTHOR]

Published

2014

33. The Answer to a Problem Posed by Zhao and Ho

Author

Jing Lu, Kai Yun Wang, and Bin Zhao

Subjects

Subcategory, Pure mathematics, Kolmogorov space, Closed set, Applied Mathematics, General Mathematics, 010102 general mathematics, 0102 computer and information sciences, 01 natural sciences, Set (abstract data type), Negative - answer, symbols.namesake, 010201 computation theory & mathematics, Mathematics::Category Theory, symbols, 0101 mathematics, Construct (philosophy), Reflective subcategory, Counterexample, Mathematics

Abstract

Zhao and Ho asked in a recent paper that for each T0 space X, whether KB(X) (the set of all irreducible closed sets of X whose suprema exist) is the canonical k-bounded sobrification of X in the sense of Keimel and Lawson. In this paper, we construct a counterexample to give a negative answer. We also consider the subcategory Topκ of the category Top0 of T0 spaces, and prove that the category KBSob of k-bounded sober spaces is a full reflective subcategory of the category KBSob of k-bounded sober spaces is a full reflective subcategory of the category Topκ.

Published

2018

34. The Vietoris functor and modal operators on rings of continuous functions

Author

Guram Bezhanishvili, Luca Carai, and Patrick J. Morandi

Subjects

Pure mathematics, Functor, Logic, Duality (order theory), Hausdorff space, Mathematics - Rings and Algebras, Mathematics - Logic, Modal operator, Adjunction, 54B20, 54D30, 54C30, 06F25, 13J25, 06E15, 06E25, 03B45, Dual (category theory), Rings and Algebras (math.RA), Mathematics::Category Theory, Bounded function, FOS: Mathematics, Logic (math.LO), Reflective subcategory, Mathematics

Abstract

We introduce an endofunctor H on the category bal of bounded archimedean l-algebras and show that there is a dual adjunction between the category Alg ( H ) of algebras for H and the category Coalg ( V ) of coalgebras for the Vietoris endofunctor V on the category of compact Hausdorff spaces. We prove that Gelfand duality lifts to a dual equivalence between Coalg ( V ) and the full reflective subcategory Alg u ( H ) of Alg ( H ) . We provide an alternate view of Alg u ( H ) by introducing an endofunctor H u on the full reflective subcategory of bal consisting of uniformly complete objects of bal and showing that Alg ( H u ) is isomorphic to Alg u ( H ) . On the one hand, these results generalize those of [1] , [19] for the category of coalgebras of the Vietoris endofunctor on the category of Stone spaces. On the other hand, they provide an alternate, more categorical proof of a recent result of [6] .

Published

2022

35. A DUALIZING OBJECT APPROACH TO NONCOMMUTATIVE STONE DUALITY.

Author

KUDRYAVTSEVA, GANNA

Subjects

*NONCOMMUTATIVE algebras, *DUALITY theory (Mathematics), *BOOLEAN algebra, *EILENBERG-Moore spectral sequences, *ADJUNCTION theory

Abstract

The aim of the present paper is to extend the dualizing object approach to Stone duality to the noncommutative setting of skew Boolean algebras. This continues the study of noncommutative generalizations of different forms of Stone duality initiated in recent papers by Bauer and Cvetko-Vah, Lawson, Lawson and Lenz, Resende, and also the current author. In this paper we construct a series of dual adjunctions between the categories of left-handed skew Boolean algebras and Boolean spaces, the unital versions of which are induced by dualizing objects $\{ 0, 1, \ldots , n+ 1\} $, $n\geq 0$. We describe the categories of Eilenberg-Moore algebras of the monads of the adjunctions and construct easily understood noncommutative reflections of left-handed skew Boolean algebras, where the latter can be faithfully embedded (if $n\geq 1$) in a canonical way. As an application, we answer the question that arose in a recent paper by Leech and Spinks to describe the left adjoint to their ‘twisted product’ functor $\omega $. [ABSTRACT FROM AUTHOR]

Published

2013

36. Subcategorías reflexivas y correflexivas de la categoría de los espacios topológicos.

Author

Jorge, A., Hernández, P., José, R., and Montañez, P.

Subjects

TOPOLOGICAL spaces, FUNCTOR theory, DENSITY, MATHEMATICAL optimization, FUNCTION spaces

Abstract

Copyright of Visión Electrónica is the property of Fondo de Universidad Distrital Francisco Jose de Caldas and its content may not be copied or emailed to multiple sites or posted to a listserv without the copyright holder's express written permission. However, users may print, download, or email articles for individual use. This abstract may be abridged. No warranty is given about the accuracy of the copy. Users should refer to the original published version of the material for the full abstract. (Copyright applies to all Abstracts.)

Published

2013

37. On Morita Contexts in Bicategories.

Author

Pécsi, Bertalan

Subjects

*MORITA duality, *MATHEMATICAL category theory, *FUNCTOR theory, *MODULES (Algebra), *UNIVERSAL algebra

Abstract

We characterize abstract Morita contexts in several bicategories. In particular, we use heteromorphisms for the bicategory $\mathbb{Prof} $ of categories and profunctors and coreflective subcategories for $\mathbb {Cat}$ (categories and functors). In addition, we prove general statements concerning strict Morita contexts, and we give new equivalent forms to the standard notions of adjointness, category equivalence and Morita equivalence by studying the collage of a profunctor. [ABSTRACT FROM AUTHOR]

Published

2012

38. The categories of flows of Set and Top

Author

Echi, Othman

Subjects

*MATHEMATICAL category theory, *SET theory, *MATHEMATICAL analysis, *DYNAMICS, *COMPACT spaces (Topology), *ITERATIVE methods (Mathematics), *MATHEMATIC morphism

Abstract

Abstract: Following John Kennison, a flow (or discrete dynamical system) in a category C is a couple , where X is an object of C and is a morphism, called the iterator. If and are flows in C, then is a morphism of flows from to if . We let denote the resulting category of flows in C. This paper deals with and , where Set and Top denote respectively the categories of sets and topological spaces. By a Gottschalk flow, we mean a flow in Top satisfying the following conditions: [(i)] If is any almost periodic point of f, then the closure is a minimal set of f; [(ii)] All points in any minimal set of f are almost periodic points. As proven by Gottschalk, if X is a compact Hausdorff space and is a continuous function, then is a Gottschalk flow. In this paper, we prove that for any flow of Set, there is a topology on X for which is a Gottschalk flow in Top. This, actually, defines a covariant functor from into . The main result of this paper provides a characterization of spaces in the image of the functor in order-theoretical terms. Some categorical properties of and are also given. [Copyright &y& Elsevier]

Published

2012

39. Order-preserving reflectors and injectivity

Author

Carvalho, Margarida and Sousa, Lurdes

Subjects

*GALOIS modules (Algebra), *GEOMETRIC connections, *MATHEMATIC morphism, *MATHEMATICAL category theory, *PARTIALLY ordered sets, *TOPOLOGICAL spaces

Abstract

Abstract: We investigate a Galois connection in poset enriched categories between subcategories and classes of morphisms, given by means of the concept of right-Kan injectivity, and, specially, we study its relationship with a certain kind of subcategories, the KZ-reflective subcategories. A number of well-known properties concerning orthogonality and full reflectivity can be seen as a particular case of the ones of right-Kan injectivity and KZ-reflectivity. On the other hand, many examples of injectivity in poset enriched categories encountered in the literature are closely related to the above connection. We give several examples and show that some known subcategories of the category of -topological spaces are right-Kan injective hulls of a finite subcategory. [Copyright &y& Elsevier]

Published

2011

40. On limits and colimits of variety-based topological systems

Author

Solovyov, Sergey A.

Subjects

*ALGEBRAIC topology, *LATTICE theory, *SET theory, *CLOSURE spaces, *LIMIT theorems, *TOPOLOGICAL spaces, *MATHEMATICAL analysis, *NUMERICAL analysis

Abstract

Abstract: The paper provides variety-based extensions of the concepts of (lattice-valued) interchange system and space, introduced by Denniston, Melton and Rodabaugh, and shows that variety-based interchange systems incorporate topological systems of Vickers, state property systems of Aerts, Chu spaces (over the category of sets in the sense of Pratt) of P.-H. Chu and contexts (of formal concept analysis) of Wille. The paper also provides an explicit description of (co)limits in the category of variety-based topological systems and applies the obtained results to extend the claim of Denniston et al. that the category of topological systems of Vickers is small initially topological over the category of sets. [Copyright &y& Elsevier]

Published

2011

41. ON THE SPECTRALIFICATION OF A HEMISPECTRAL SPACE.

Author

ECHI, OTHMAN, ABDALLAHI, MOHAMED OUELD, and Facchini, A.

Subjects

*SPECTRAL theory, *TOPOLOGICAL spaces, *MATHEMATICAL mappings, *INTERSECTION theory, *LINEAR algebra, *MATHEMATICAL category theory, *PROBLEM solving

Abstract

An open subset U of a topological space X is called intersection compact open, or ICO, if for every compact open set Q of X, U ∩ Q is compact. A continuous map f of topological spaces will be called spectral if f-1 carries ICO sets to ICO sets. Call a topological space Xhemispectral, if the intersection of two ICO sets of X is an ICO. Let HSPEC be the category whose objects are hemispectral spaces and arrows spectral maps. Let SPEC be the full subcategory of HSPEC whose objects are spectral spaces. The main result of this paper proves that SPEC is a reflective subcategory of HSPEC. This gives a complete answer to Problem BST1 of "O. Echi, H. Marzougui and E. Salhi, Problems from the Bizerte-Sfax-Tunis seminar, in Open Problems in Topology II, ed. E. Pearl (Elsevier, 2007), pp. 669-674." [ABSTRACT FROM AUTHOR]

Published

2011

42. Thoughts on Quotient-fine Nearness Frames.

Author

Dube, Themba and Mugochi, Martin M.

Subjects

*QUOTIENT rings, *NEARNESS spaces, *TOPOLOGY, *FRAMES (Combinatorial analysis), *COMBINATORIAL designs & configurations

Abstract

We characterize nearness frames whose completions are fine (we call them quotient-fine), and show that the subcategory QfNFrm they form is reflective in the category of strong nearness frames. The resulting functor commutes with the completion functor. QfNFrm is isomorphic to the subcategory of the functor category ( RegFrm) given by the dense onto $h\colon M\to L$, where 2 denotes the category with only two objects and exactly one morphism between them. [ABSTRACT FROM AUTHOR]

Published

2011

43. MODELS AND VAN KAMPEN THEOREMS FOR DIRECTED HOMOTOPY THEORY.

Author

BUBENIK, PETER

Subjects

*HOMOTOPY theory, *TOPOLOGICAL spaces, *GROUPOIDS, *BIPARTITE graphs, *FUNDAMENTAL groups (Mathematics), *MATHEMATICAL models, *MATHEMATICAL analysis

Abstract

We study topological spaces with a distinguished set of paths, called directed paths. Since these directed paths are generally not reversible, the directed homotopy classes of directed paths do not assemble into a groupoid, and there is no direct analog of the fundamental group. However, they do assemble into a category, called the fundamental category. We define models of the fundamental category, such as the fundamental bipartite graph, and minimal extremal models which are shown to generalize the fundamental group. In addition, we prove van Kampen theorems for subcategories, retracts, and models of the fundamental category. [ABSTRACT FROM AUTHOR]

Published

2009

44. A HOMOTOPICAL ALGEBRA OF GRAPHS RELATED TO ZETA SERIES.

Author

BISSON, TERRENCE and TSEMO, ARISTIDE

Subjects

*HOMOLOGICAL algebra, *HOMOTOPY theory, *GRAPH theory, *HOMOTOPY equivalences, *MATHEMATICAL category theory, *MATHEMATICAL analysis

Abstract

The purpose of this paper is to develop a homotopical algebra for graphs, relevant to the zeta series and the spectra of finite graphs. More precisely, we define a Quillen model structure in a category of graphs (directed and possibly infinite, with loops and multiple arcs allowed). The weak equivalences for this model structure are the Acyclics (graph morphisms which preserve cycles). The cofibrations and fibrations for the model are determined from the class of Whiskerings (graph morphisms produced by grafting trees). Our model structure seems to fit well with the importance of acyclic directed graphs in many applications. [ABSTRACT FROM AUTHOR]

Published

2009

45. Adjoining an Identity to a Reduced Archimedean f-Ring.

Author

Hager, A. W. and Johnson, D. G.

Subjects

*REPRESENTATIONS of rings (Algebra), *MATHEMATIC morphism, *RING theory, *MATHEMATICAL category theory, *ALGEBRA

Abstract

Let frA denote the category of f-rings which are reduced and Archimedean, and let Φ be the (nonfull) subcategory of such rings with identity (each with the natural morphisms). Some time ago, the second author showed, using his representation theory, that for each A ∈ | frA| there is a certain minimal embedding uA:A→ uA ∈ | Φ|. More recently, he has revisited the representation theory, expanding it to include the representation of morphisms. Based upon this, the present article analyzes the operator u:| frA| → Φ: the construction of uA is tidied, several characterizations of the pair (uA, uA) are given, and the relation between the maximal ideal structures of A and uA is described. Membership in the class U of frA-morphisms that are "u-extendable" is characterized and it is shown that U = (| frA|,U) is a category in which Φ is a full essentially-reflective subcategory. The frA-objects are characterized for which, respectively, ∀ B(frA(A, B) = U (A, B)), and, ∀ B ≠ 0(frA(B, A) = U(B, A)). [ABSTRACT FROM AUTHOR]

Published

2007

46. Maps and Monads for Modal Frames.

Author

Goldblatt, Robert

Abstract

The category-theoretic nature of general frames for modal logic is explored. A new notion of "modal map" between frames is defined, generalizing the usual notion of bounded morphism/p-morphism. The category Fm of all frames and modal maps has reflective subcategories CHFm of compact Hausdorff frames, DFm of descriptive frames, and UEFm of ultrafilter enlargements of frames. All three subcategories are equivalent, and are dual to the category of modal algebras and their homomorphisms. An important example of a modal map that is typically not a bounded morphism is the natural insertion of a frame A into its ultrafilter enlargement EA. This map is used to show that EA is the free compact Hausdorff frame generated by A relative to Fm. The monad E of the resulting adjunction is examined and its Eilenberg-Moore category is shown to be isomorphic to CHFm. A categorical equivalence between the Kleisli category of E and UEFm is defined from a construction that assigns to each frame A a frame A* that is "image-closed" in the sense that every point-image {b : aRb} in A is topologically closed. A* is the unique image-closed frame having the same ultrafilter enlargement as A. These ideas are connected to a category 2U shown by S. K. Thomason to be dual to the category of complete and atomic modal algebras and their homomorphisms. 2U is the full subcategory of the Kleisli category of E based on the Kripke frames. [ABSTRACT FROM AUTHOR]

Published

2006

47. REFLECTION OF SOME QUASI-LOCAL DOMAINS.

Author

AYACHE, AHMED, DOBBS, DAVID E., and ECHI, OTHMAN

Subjects

*HOMOMORPHISMS, *MATHEMATIC morphism, *MATHEMATICAL category theory, *SET theory, *MATHEMATICAL functions

Abstract

If (R, M) and (S, N) are quasi-local domains and f : R → S is a ring homomorphism, then f is said to be a strong local homomorphism if f(M) = N. Let PVD be the category whose objects are the pseudo-valuation domains that are not fields and whose morphisms are the strong local homomorphisms; let VD be the full subcategory of PVD whose objects are all the valuation domains that are not fields. Then VD is shown to be a reflective subcategory of PVD. This result is extended by obtaining a reflective conclusion for a category whose class of objects properly contains all pseudo-valuation domains. [ABSTRACT FROM AUTHOR]

Published

2006

48. ON THE EMBEDDING OF TOP IN THE CATEGORY OF STRATIFIED L-TOPOLOGICAL SPACES.

Author

Lai Hongliang and Zhang Dexue

Subjects

*CONTINUOUS lattices, *TOPOLOGICAL spaces, *LATTICE theory, *TOPOLOGY, *GEOMETRY

Abstract

Let L be a meet continuous lattice. It is proved that the category Top of topological spaces can be embedded in the category of stratified L-topological spaces as a concretely both reflective and coreflective full subcategory if and only if L is a continuous lattice. [ABSTRACT FROM AUTHOR]

Published

2005

49. Quantale algebras as lattice-valued quantales

Author

Supeng Wu, Kaiyun Wang, and Bin Zhao

Subjects

Semigroup, Nuclear Theory, 010102 general mathematics, Quantale, Mathematics::General Topology, 02 engineering and technology, Commutative ring, 01 natural sciences, Fuzzy logic, Theoretical Computer Science, Nonlinear Sciences::Chaotic Dynamics, Algebra, Mathematics::Category Theory, Lattice (order), 0202 electrical engineering, electronic engineering, information engineering, 020201 artificial intelligence & image processing, Geometry and Topology, 0101 mathematics, Software, Reflective subcategory, Mathematics

Abstract

In this paper, we present an investigation of quantale algebras (Q-algebras for short) as lattice-valued quantales (Q-quantales for short). First, we prove that the set of all fuzzy ideals of a commutative ring with appropriate operations is a [0, 1]-quantale. Furthermore, we discuss some properties of localic nuclei on Q-algebras, and show that the category of Q-algebras with the quantale structures being frames is a full reflective subcategory of the category of Q-algebras. From this result, we can conclude that the category of L-frames is a full reflective subcategory of the category of L-quantales, where L is a frame. Finally, we build and characterize the Q-quantale completions of a Q-ordered semigroup.

Published

2016

50. Frink quasicontinuous posets

Author

Xiao-Quan Xu and Wenfeng Zhang

Subjects

Discrete mathematics, Pure mathematics, Mathematics::Combinatorics, Algebra and Number Theory, 010102 general mathematics, Mathematics::General Topology, 0102 computer and information sciences, 01 natural sciences, 010201 computation theory & mathematics, Lattice (order), Homomorphism, 0101 mathematics, Partially ordered set, Reflective subcategory, Mathematics, Dedekind–MacNeille completion

Abstract

In this paper, the concept of Frink quasicontinuous posets is introduced. The main results are: (1) a poset is a Frink quasicontinuous poset if and only if its normal completion is a quasicontinuous lattice; (2) a poset is precontinuous if and only if it is Frink quasicontinuous and meet precontinuous; (3) when a Frink quasicontinuous poset satisfies certain conditions, the way below relation has the interpolation property; (4) the category of quasicontinuous lattices with complete homomorphisms is a full reflective subcategory of the category of Frink quasicontinuous posets with cut-stable maps.

Published

2015