Bağırmaz, Nurettin
Loading...
Name Variants
Bağırmaz N.
Bagirmaz, Nurettin
Bagirmaz, Nurettin
Job Title
Doktor Öğretim Üyesi
Email Address
Main Affiliation
Department of Electronics and Automatization / Elektronik ve Otomasyon Bölümü
Status
Website
ORCID ID
Scopus Author ID
Turkish CoHE Profile ID
Google Scholar ID
WoS Researcher ID
Sustainable Development Goals Report Points
SDG data could not be loaded because of an error. Please refresh the page or try again later.
Scholarly Output
8
Articles
7
Citation Count
0
Supervised Theses
0
7 results
Scholarly Output Search Results
Now showing 1 - 7 of 7
Article Citation - WoS: 8Citation - Scopus: 9Soft Sets and Soft Topology on Nearness Approximation Spaces(UNIV NIS, FAC SCI MATH, 2017) Bağırmaz, Nurettin; Icen, Ilhan; Bagirmaz, Nurettin; Ozcan, Abdullah Fatih; Department of Electronics and Automatization / Elektronik ve Otomasyon BölümüNear set theory presents a fundamental basis for observation, comparison and classification of perceptual granules. Soft set theory is proposed as a general framework to model vagueness. The purpose of this paper is to combine these two theories in what are known near soft sets in defining near soft topology based on a nearness approximation space.Article Citation - WoS: 5Near ideals in near semigroups(EUROPEAN JOURNAL PURE & APPLIED MATHEMATICS, 2018) Bağırmaz, Nurettin; Department of Electronics and Automatization / Elektronik ve Otomasyon BölümüIn this paper, we introduced the notion of near subsemigroups, near ideals, near bi-ideals and homomorphisms of near semigroups on near approximation spaces. Then we give some properties of these near structures.Article Citation - WoS: 0THE LEFT (RIGHT) ROUGH APPROXIMATIONS IN A GROUP(PUSHPA PUBLISHING HOUSE, 2019) Bağırmaz, Nurettin; Tasbozan, Hatice; Department of Electronics and Automatization / Elektronik ve Otomasyon BölümüRough set theory proposes a new mathematical approach to model vagueness. In this paper, we introduce a new definition for rough approximations with respect to the subgroups of a group, which is called the left (right) lower and upper approximations. In fact, we prove that this definition is a generalization of definition in [5]. Then we give some properties of these rough approximations.Article DIRECT PRODUCTS OF ROUGH SUBGROUPS(2019) Bağırmaz, Nurettin; Department of Electronics and Automatization / Elektronik ve Otomasyon BölümüIn this research, the direct products of the rough approximations and rough subgroups in a group by direct product of normal subgroups are studied. In addition, some basic properties and homomorphic images of these structures are examined.Article Citation - WoS: 0Citation - Scopus: 0A Topological Approach for Rough Semigroups(Amer inst Mathematical Sciences-aims, 2024) Bağırmaz, Nurettin; Department of Electronics and Automatization / Elektronik ve Otomasyon BölümüThis study presents a novel approach to defining topological rough semigroups on an approximation space. The concepts of topological space and rough semigroup are naturally combined to achieve this goal. Also, some basic results and examples are presented. Furthermore, some compactness properties are also studied. In addition, their rough subsemigroups and rough ideals areArticle Citation - WoS: 2Citation - Scopus: 1Comparison of near sets by means of a chain of features(2016) Bağırmaz, Nurettin; Bağırmaz, Nurettin; Department of Electronics and Automatization / Elektronik ve Otomasyon BölümüIf the number of features of objects in a perceptual system, is large, then the objects can be known better and comparable. In this paper basically, we form a chain of feature sets that describe objects and then by means of this chain of feature sets, we investigate the nearness of sets and near sets in a perceptual systemArticle Citation - WoS: 6Citation - Scopus: 8Near approximations in groups(Springer Verlag, 2018) Bağırmaz, Nurettin; Department of Electronics and Automatization / Elektronik ve Otomasyon BölümüIn this paper, we firstly introduce the notion of a near approximations in a group, which is an extended notion of a rough approximations in a group. Then we define lower and upper near subgroups based on normal subgroups in a group and give some properties of such subgroups. Furthermore, we obtain a comparison between these types of approximations and the approximation introduced by Kuroki and Wang (Inf Sci 90:203–220, 1996). © 2018, Springer-Verlag GmbH Germany, part of Springer Nature.
