Your search keyword '"Seçil Çeken"' showing total 27 results

1. Generalizations of strongly hollow ideals and a corresponding topology

Author

Seçil Çeken and Cem Yüksel

Subjects

strongly hollow submodule, pseudo strongly hollow submodule, m-strongly hollow ideal, psh-zariski topology, Mathematics, QA1-939

Abstract

In this paper, we introduce and study the notions of $ M $-strongly hollow and $ M $-PS-hollow ideals where $ M $ is a module over a commutative ring $ R $. These notions are generalizations of strongly hollow ideals. We investigate some properties and characterizations of $ M $-strongly hollow ($ M $-PS-hollow) ideals. Then we define and study a topology on the set of all $ M $-PS-hollow ideals of a commutative ring $ R $. We investigate when this topological space is irreducible, Noetherian, $ T_{0} $, $ T_{1} $ and spectral space.

Published

2021

2. 2-Absorbing coprimary submodules

Author

Gezen, Seçil Çeken

Published

2021

3. On normal modules

Author

Chillumuntala Jayaram, Ünsal Tekir, Suat Koç, Seçil Çeken, and Jayaram C., Tekir Ü., Koç S., Çeken S.

Subjects

Matematik, Commutative Rings and Algebras, Multidisipliner, Multidisciplinary, Algebra and Number Theory, MULTIDISCIPLINARY SCIENCES, Logic, Temel Bilimler, Temel Bilimler (SCI), Doğa Bilimleri Genel, Geometri ve Topoloji, ÇOK DİSİPLİNLİ BİLİMLER, MATHEMATICS, NATURAL SCIENCES, GENERAL, Ayrık Matematik ve Kombinatorik, Fizik Bilimleri, Değişmeli Halkalar ve Cebirler, MATEMATİK, Natural Sciences (SCI), Physical Sciences, Discrete Mathematics and Combinatorics, Mantık, Geometry and Topology, Natural Sciences

Abstract

Recall that a commutative ring R is said to be a normal ring if it is reduced and every two distinct minimal prime ideals are comaximal. A finitely generated reduced R-module M is said to be a normal module if every two distinct minimal prime submodules are comaximal. The concepts of normal modules and locally torsion free modules are different, whereas they are equal in theory of commutative rings. We give many properties and examples of normal modules, we use them to characterize locally torsion free modules and Baer modules. Also, we give the topological characterizations of normal modules.

Published

2022

4. On S-second spectrum of a module

Author

SEÇIL ÇEKEN

Subjects

Computational Mathematics, Algebra and Number Theory, Applied Mathematics, Geometry and Topology, Analysis

Published

2022

5. 2-Absorbing coprimary submodules

Author

Seçil Çeken Gezen

Subjects

Pure mathematics, Class (set theory), Noetherian ring, Algebra and Number Theory, Generalization, Structure (category theory), Geometry and Topology, Algebraic geometry, Algebra over a field, Mathematics

Abstract

The purpose of this paper is to introduce the concept of 2-absorbing coprimary submodule of a module as a generalization of strongly 2-absorbing second submodules and investigate some properties of this submodule class. We study the structure of 2-absorbing coprimary submodules of comultiplication modules, fully coidempotent modules and modules over a Noetherian ring. We also investigate some interrelations with 2-absorbing coprimary submodules, strongly 2-absorbing second submodules and strongly 2-absorbing secondary submodules.

Published

2021

6. On the upper dual Zariski topology

Author

Seçil Çeken

Subjects

Zariski topology, Pure mathematics, Mathematics::Commutative Algebra, Mathematics::K-Theory and Homology, General Mathematics, Mathematics::Rings and Algebras, Dual (category theory), Mathematics

Abstract

Let R be a ring with identity and M be a left R-module. The set of all second submodules of M is called the second spectrum of M and denoted by Specs(M). For each prime ideal p of R we define Specsp(M) := {S? Specs(M) : annR(S) = p}. A second submodule Q of M is called an upper second submodule if there exists a prime ideal p of R such that Specs p(M)? 0 and Q = ? S2Specsp(M)S. The set of all upper second submodules of M is called upper second spectrum of M and denoted by u.Specs(M). In this paper, we discuss the relationships between various algebraic properties of M and the topological conditions on u.Specs(M) with the dual Zarsiki topology. Also, we topologize u.Specs(M) with the patch topology and the finer patch topology. We show that for every left R-module M, u.Specs(M) with the finer patch topology is a Hausdorff, totally disconnected space and if M is Artinian then u.Specs(M) is a compact space with the patch and finer patch topology. Finally, by applying Hochster?s characterization of a spectral space, we show that if M is an Artinian left R-module, then u.Specs(M) with the dual Zariski topology is a spectral space.

Published

2020

7. Comultiplication modules relative to a hereditary torsion theory

Author

Seçil Çeken

Subjects

Pure mathematics, Algebra and Number Theory, Torsion theory, Identity (philosophy), media_common.quotation_subject, 010102 general mathematics, 010103 numerical & computational mathematics, Commutative ring, 0101 mathematics, 01 natural sciences, media_common, Mathematics

Abstract

Let R be a commutative ring with identity and τ be a hereditary torsion theory on R-Mod. In this article, we introduce and study the concept of τ-comultiplication module. We present several propert...

Published

2019

8. Second Spectrum of Modules and Spectral Spaces

Author

Seçil Çeken and Mustafa Alkan

Subjects

Discrete mathematics, Zariski topology, Mathematics::Commutative Algebra, General Mathematics, 010102 general mathematics, Spectrum (functional analysis), Dimension (graph theory), Spectral space, Commutative ring, 01 natural sciences, Separation axiom, 010101 applied mathematics, Identity (mathematics), 0101 mathematics, Topology (chemistry), Mathematics

Abstract

Let R be a commutative ring with identity and $$\hbox {Spec}^{s}(M)$$ denote the set all second submodules of an R-module M. In this paper, we investigate various properties of $$\hbox {Spec}^{s}(M)$$ with respect to different topologies. We investigate the dual Zariski topology from the point of view of separation axioms, spectral spaces and combinatorial dimension. We establish conditions for $$\hbox {Spec}^{s}(M)$$ to be a spectral space with respect to quasi-Zariski topology and second classical Zariski topology. We also present some conditions under which a module is cotop.

Published

2017

9. On the interior of a submodule with respect to a set of ideals

Author

Seçil Çeken

Subjects

Class (set theory), Pure mathematics, Mathematics::Commutative Algebra, Mathematics::Rings and Algebras, 010102 general mathematics, 010103 numerical & computational mathematics, Commutative ring, 01 natural sciences, Identity (music), Set (abstract data type), Mathematics (miscellaneous), I-second submodule, interior operation, I-interior of a submodule, attached prime ideal, 0101 mathematics, Mathematics::Representation Theory, Mathematics

Abstract

In this paper, we investigate interior operations on submodules and introduce a new interior operation by using a certain submodule class. Let R be a commutative ring with identity and I be a set of ideals of R. We define I-second submodules and I-interior of a submodule. We show that second, secondary and strongly second submodules are special types of I-second submodules. We investigate several properties of I-interiors of submodules and give a concrete expression of I-interior of a submodule of an Artinian module. We use the concept of I-interior of a submodule to find some results on I-second submodules and attached primes of an Artinian module.Mathematics Subject Classification (2010): 13A15, 13C13, 13C99.Keywords: I-second submodule, interior operation, I-interior of a submodule, attached prime ideal

Published

2019

10. Singular and nonsingular modules relative to a torsion theory

Author

Seçil Çeken and Mustafa Alkan

Subjects

Class (set theory), Algebra and Number Theory, 010102 general mathematics, Free module, 010103 numerical & computational mathematics, 01 natural sciences, Injective module, law.invention, Algebra, Invertible matrix, Module, law, Projective module, 0101 mathematics, Indecomposable module, Simple module, Mathematics

Abstract

In this paper, we introduce and study torsion-theoretic generalizations of singular and nonsingular modules by using the concept of τ-essential submodule for a hereditary torsion theory τ. We introduce two new module classes called τ-singular and non-τ-singular modules. We investigate some properties of these module classes and present some examples to show that these new module classes are different from singular and nonsingular modules. We give a characterization of τ-semisimple rings via non-τ-singular modules. We prove that if M∕τ(M) is non-τ-singular for a module M, then every submodule of M has a unique τ-closure. We give some properties of the torsion theory generated by the class of all τ-singular modules. We obtain a decomposition theorem for a strongly τ-extending module by using non-τ-singular modules.

Published

2016

11. On the weakly second spectrum of a module

Author

Seçil Çeken and Mustafa Alkan

Subjects

Discrete mathematics, Pure mathematics, Ring (mathematics), Mathematics::Commutative Algebra, General Mathematics, 010102 general mathematics, Spectrum (functional analysis), 010103 numerical & computational mathematics, Commutative ring, Topological space, 01 natural sciences, Set (abstract data type), Compact space, Point (geometry), 0101 mathematics, Mathematics::Representation Theory, Topology (chemistry), Mathematics

Abstract

In this paper, we extend the definition of weakly second submodule of a module over a commutative ring to a module over an arbitrary ring. First, we investigate some properties of weakly second submodules. We define the notion of weakly second radical of a submodule and determine the weakly second radical of some modules. We also define the notion of weak m*-system and characterize the weakly second radical of a submodule in terms of weak m*-systems. Then we introduce and study a topology on the set of all weakly second submodules of a module. We give some results concerning irreducible subsets, irreducible components and compactness of this topological space. Finally, we investigate this topological space from the point of view of spectral spaces.

Published

2016

12. On strongly 2-absorbing second submodules

Author

Mustafa Alkan and Seçil Çeken

Subjects

Class (set theory), Pure mathematics, Generalization, Dual (category theory), Mathematics

Abstract

In this paper, we study on the concept of strongly 2-absorbing second submodule which is a dual notion of 2-absorbing submodule and a generalization of second submodule. We give some properties and characterizations of this submodule class and investigate the relationships with second and secondary submodules.

Published

2018

13. A sheaf on the second spectrum of a module

Author

Mustafa Alkan, Seçil Çeken, and Fen Fakültesi

Subjects

Pure mathematics, 010103 numerical & computational mathematics, Commutative ring, Commutative Algebra (math.AC), 01 natural sciences, Spectrum (topology), Identity (music), Set (abstract data type), Mathematics::Algebraic Geometry, Mathematics::K-Theory and Homology, Mathematics::Category Theory, Prıme Spectrum, FOS: Mathematics, 13C13, 13C99, 14A15, 14A05, 0101 mathematics, Mathematics, Zariski topology, Dual Zariski Topology, Algebra and Number Theory, Mathematics::Commutative Algebra, Mathematics::Rings and Algebras, 010102 general mathematics, Mathematics - Commutative Algebra, Sheaf Of Modules, Second Submodule, Zarıskı Topology, Dual Notıon, Sheaf, Sheaf of modules

Abstract

Let R be a commutative ring with identity and Spec(5)(M) denote the set all second submodules of an R-module M. In this paper, we construct and study a sheaf of modules, denoted by O(N, M), on Spec(5)(M) equipped with the dual Zariski topology of M, where N is an R-module. We give a characterization of the sections of the sheaf O(N, M) in terms of the ideal transform module. We present some interrelations between algebraic properties of N and the sections of O(N, M). We obtain some morphisms of sheaves induced by ring and module homomorphisms.

Published

2018

14. The discriminant controls automorphism groups of noncommutative algebras

Author

Seçil Çeken, James J. Zhang, Yanhua Wang, and John H. Palmieri

Subjects

Discrete mathematics, Pure mathematics, Inner automorphism, Root of unity, General Mathematics, Polynomial ring, SO(8), Outer automorphism group, Graph automorphism, Automorphism, Noncommutative geometry, Mathematics

Abstract

We use the discriminant to determine the automorphism groups of some noncommutative algebras, and we prove that a family of noncommutative algebras has tractable automorphism groups. There is a long history and an extensive study of the automorphism groups of algebras. Determining the full automorphism group of an algebra is generally a no- toriously difficult problem. For example, the automorphism group of t polynomial ring of three variables is not yet understood, and a remarkable result in this direction is given by Shestakov-Umirbaev (SU) which shows the Nagata automorphism is a wild automorphism. Since 1990s, many researchers have been successfully comput- ing the automorphism groups of interesting infinite-dimensional noncommutative algebras, including certain quantum groups, generalized quantum Weyl algebras, skew polynomial rings and many more - see (AlC, AlD, AnD, BJ, GTK, SAV), which is only a partial list. Recently, by using a rigidity theorem for quantum tori, Yakimov has proved the Andruskiewitsch-Dumas conjecture and the Launois- Lenagan conjecture in (Y1, Y2), each of which determines the automorphism group of a family of quantized algebras with parameter q being not a root of unity. A uniform approach to both the Andruskiewitsch-Dumas conjecture and the Launois- Lenagan conjecture is provided in a preprint by Goodearl-Yakimov (GY). These beautiful results, as well as others, motivated us to look into the automorphism groups of noncommutative algebras.

Published

2015

15. On Second Submodules

Author

Seçil Çeken and Mustafa Alkan

Published

2015

16. On a subspace of dual Zariski topology

Author

Seçil Çeken

Subjects

Combinatorics, Discrete mathematics, Zariski tangent space, Zariski topology, Mathematics::Commutative Algebra, Weak topology, Extension topology, Commutative ring, General topology, Subspace topology, Irreducible component, Mathematics

Abstract

Let R be a commutative ring with identity and S pecs(M) (resp. Min(M)) denote the set of all second (resp. minimal) submodules of a non-zero R-module M. In this paper, we investigate several properties of the subspace topology on Min(M) induced by the dual Zariski on S pecs(M) and determine some cases in which Min(M) is a max-spectral space.

Published

2017

17. Second Modules Over Noncommutative Rings

Author

P.F. Smith, Seçil Çeken, and Mustafa Alkan

Subjects

Discrete mathematics, Principal ideal ring, Associated prime, Algebra and Number Theory, Primitive ring, Mathematics::Commutative Algebra, Division ring, Maximal ideal, Minimal ideal, Injective module, Simple module, Mathematics

Abstract

Let R be an arbitrary ring. A nonzero unital right R-module M is called a second module if M and all its nonzero homomorphic images have the same annihilator in R. It is proved that if R is a ring such that R/P is a left bounded left Goldie ring for every prime ideal P of R, then a right R-module M is a second module if and only if Q = ann R (M) is a prime ideal of R and M is a divisible right (R/Q)-module. If a ring R satisfies the ascending chain condition on two-sided ideals, then every nonzero R-module has a nonzero homomorphic image which is a second module. Every nonzero Artinian module contains second submodules and there are only a finite number of maximal members in the collection of second submodules. If R is a ring and M is a nonzero right R-module such that M contains a proper submodule N with M/N a second module and M has finite hollow dimension n, for some positive integer n, then there exist a positive integer k ≤ n and prime ideals P i (1 ≤ i ≤ k) such that if L is a proper submodule of M...

Published

2013

18. On τ-Extending Modules

Author

Mustafa Alkan and Seçil Çeken

Subjects

Class (set theory), Pure mathematics, Generalization, Direct sum, General Mathematics, Decomposition theorem, Mathematics

Abstract

Motivated by [2] and [6], we introduce a generalization of extending (CS) modules by using the concept of τ-large submodule which was defined in [9]. We give some properties of this class of modules and study their relationship with the familiar concepts of τ-closed, τ-complement submodules and the other generalization of extending modules (τ-complemented, τ-CS, s−τ-CS modules). We are also interested in determining when a τ-divisible module is τ-extending. For a τ-extending module M with C3, we obtain a decomposition theorem that there is a submodule K of M such that \(M = \tau (M)\,\oplus\,K\) and K is τ (M)-injective. We also treat when a direct sum of τ-extending modules is τ-extending.

Published

2010

19. On graded 2-absorbing and graded weakly 2-absorbing ideals

Author

Seçil Çeken, Rashid Abu-Dawwas, and Khaldoun Al-Zoubi

Subjects

010101 applied mathematics, Pure mathematics, Matematik, Homogeneous, graded 2-absorbing ideal,graded weakly 2-absorbing ideal,graded weakly prime ideal,graded prime ideal, 010102 general mathematics, Graded ring, General Medicine, 0101 mathematics, 01 natural sciences, Mathematics

Abstract

In this paper, we introduce and study graded 2-absorbing and graded weakly 2-absorbing ideals of a graded ring which are different from 2-absorbing and weakly 2-absorbing ideals. We give some properties and characterizations of these ideals and their homogeneous components. We investigate graded (weakly) 2-absorbing ideals of $R_{1}\times R_{2}$ where $R_{1}$ and $R_{2}$ are two graded rings.

Published

2015

20. On Graded Second And Coprimary Modules And Graded Secondary Representations

Author

Mustafa Alkan and Seçil Çeken

Subjects

Discrete mathematics, Noetherian ring, Pure mathematics, Mathematics::Commutative Algebra, General Mathematics, Mathematics::Rings and Algebras, Graded ring, Commutative property, Injective module, Prime (order theory), Injective function, Mathematics

Abstract

In this paper we introduce and study the concepts of graded second (gr-second) and graded coprimary (gr-coprimary) modules which are different from second and coprimary modules over arbitrary-graded rings. We list some properties and characterizations of gr-second and gr-coprimary modules and also study graded prime submodules of modules with gr-coprimary decompositions. We also deal with graded secondary representations for graded injective modules over commutative-graded rings. By using the concept of \(\sigma \)-suspension \((\sigma )M\) of a graded module \(M,\) we prove that a graded injective module over a commutative graded Noetherian ring has a graded secondary representation.

Published

2015

21. The discriminant criterion and automorphism groups of quantized algebras

Author

James J. Zhang, John H. Palmieri, Seçil Çeken, and Yanhua Wang

Subjects

Pure mathematics, General Mathematics, Polynomial ring, 010102 general mathematics, Skew, Mathematics - Rings and Algebras, Automorphism, 01 natural sciences, Tensor product, Discriminant, Rings and Algebras (math.RA), Primary 16W20, 11R29, 0103 physical sciences, FOS: Mathematics, 010307 mathematical physics, 0101 mathematics, Quantum, Mathematics

Abstract

We compute the automorphism groups of some quantized algebras, including tensor products of quantum Weyl algebras and some skew polynomial rings., Comment: 38 pages

Published

2014

22. The Dual Notion Of The Prime Radical Of A Module

Author

Patrick F. Smith, Seçil Çeken, and Mustafa Alkan

Subjects

Pure mathematics, Algebra and Number Theory, Radical of a module, Mathematics::Commutative Algebra, Mathematics::Rings and Algebras, Noetherian module, Jacobson radical, Injective module, Radical of a ring, Module, Semisimple module, Radical of an ideal, Physics::Chemical Physics, Mathematics

Abstract

In this article, we study the second radical of a module over an arbitrary ring R as the dual notion of the prime radical of a module. We give some properties of the second radical and determine the second radical of some modules. We define the notion of m*-system and describe the second radical of submodules in terms of m*-systems. We investigate when the second radical of a module M is equal to the socle of M. In particular, we give a characterization of the socle of a noetherian module over a ring R such that the ring R/P is right artinian for every right primitive ideal P by using the concept of second radical. We also give a characterization of right quasi-duo artinian rings by using the second radical of an injective module. (C) 2013 Elsevier Inc. All rights reserved.

Published

2013

23. On Prime Submodules And Primary Decompositions In Two-Generated Free Modules

Author

Mustafa Alkan and Seçil Çeken

Subjects

Discrete mathematics, 13C99, Pure mathematics, Primary (chemistry), primary decomposition, General Mathematics, primary submodule, Commutative ring, Characterization (mathematics), Prime (order theory), 13A99, 13C10, Primary decomposition, Associated prime, Identity (mathematics), prime submodule, Finitely-generated abelian group, Mathematics

Abstract

In this paper, we consider the free R-module R circle plus R, where R is an arbitrary commutative ring with identity. We give a full characterization for prime submodules of R circle plus R and a useful primeness test for a finitely generated submodule of R circle plus R. We study the existence of primary decomposition of a submodule of R circle plus R and characterize the minimal primary decomposition. As applications of our results, we give some examples of primary decompositions in R circle plus R.

Published

2013

24. Dual of Zariski Topology for Modules

Author

Seçil Çeken, Mustafa Alkan, Theodore E. Simos, George Psihoyios, Ch. Tsitouras, and Zacharias Anastassi

Subjects

Discrete mathematics, Zariski topology, Hardware_MEMORYSTRUCTURES, Mathematics::Commutative Algebra, Spectrum of a ring, Weak topology, Mathematics::Rings and Algebras, Extension topology, Initial topology, Topological space, Strong topology (polar topology), Computer Science::Performance, Mathematics::K-Theory and Homology, ComputingMethodologies_SYMBOLICANDALGEBRAICMANIPULATION, General topology, Mathematics

Abstract

In this paper we introduce the dual Zariski topology on the set of second submodules of M, denoted by Specs(M), for an R‐module M. We give some relationships between Specs(M) and Spec(R/Ann(M)). By using this topological space, we give some characterizations of rings and modules.

Published

2011

25. On Radical Formula over Free Modules with Two Generators

Author

Seçil Çeken, Mustafa Alkan, Theodore E. Simos, George Psihoyios, Ch. Tsitouras, and Zacharias Anastassi

Subjects

Principal ideal ring, Discrete mathematics, Reduced ring, Radical of a ring, Pure mathematics, Noncommutative ring, Mathematics::Commutative Algebra, Radical of an ideal, Jacobson radical, Commutative ring, Physics::Chemical Physics, Simple module, Mathematics

Abstract

In this paper, we study on the module M = R⊕R over a commutative ring R with identity. After characterizing the radical of a submodule N of M, we give some conditions for N to satisfy the radical formula. In particular, we show that R⊕R satisfy the radical formula if R is an arithmetical ring.

Published

2011

26. On the second spectrum and the second classical Zariski topology of a module

Author

Mustafa Alkan and Seçil Çeken

Subjects

Discrete mathematics, Zariski topology, Ring (mathematics), Pure mathematics, Algebra and Number Theory, Social connectedness, Applied Mathematics, Noetherian module, Spectrum (topology), Compact space, ComputingMethodologies_SYMBOLICANDALGEBRAICMANIPULATION, Connection (algebraic framework), Finite set, Mathematics

Abstract

Let R be an associative ring with identity and Specs(M) denote the set of all second submodules of a right R-module M. In this paper, we investigate some interrelations between algebraic properties of a module M and topological properties of the second classical Zariski topology on Specs(M). We prove that a right R-module M has only a finite number of maximal second submodules if and only if Specs(M) is a finite union of irreducible closed subsets. We obtain some interrelations between compactness of the second classical Zariski topology of a module M and finiteness of the set of minimal submodules of M. We give a connection between connectedness of Specs(M) and decomposition of M for a right R-module M. We give several characterizations of a noetherian module M over a ring R such that every right primitive factor of R is artinian for which Specs(M) is connected.

Published

2015

27. On Graded Second and Coprimary Modules and Graded Secondary Representations.

Author

Seçil Çeken and Alkan, Mustafa

Subjects

*ARBITRARY constants, *NOETHERIAN rings, *ARBITRARY waveform generators, *ALGORITHMS, *MATHEMATICS

Abstract

In this paper we introduce and study the concepts of graded second (gr-second) and graded coprimary (gr-coprimary) modules which are different from second and coprimary modules over arbitrary-graded rings. We list some properties and characterizations of gr-second and gr-coprimary modules and also study graded prime submodules of modules with gr-coprimary decompositions. We also deal with graded secondary representations for graded injective modules over commutative-graded rings. By using the concept of $$\sigma $$ -suspension $$(\sigma )M$$ of a graded module $$M,$$ we prove that a graded injective module over a commutative graded Noetherian ring has a graded secondary representation. [ABSTRACT FROM AUTHOR]

Published

2015