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Toplam kayıt 70, listelenen: 51-60
Asymptotically lacunary I_2-invariant equivalence
(International Conference on Mathematical and Related Sciences, 2018)
In this study, the concept of asymptotically lacunary I_2-invariant equivalence, the concepts of asymptotically lacunary σ_2-equivalence and the concept of asymptotically lacunary invariant S_2-equivalence for double ...
Wijsman ptrongly p-Cesàro summability and Wijsman statistical convergence of order α for double set sequences
(3rd International Congress on Science and Education, 2019)
The concept of statistical convergence was introduced by Steinhaus (1951) and Fast (1951), and later reintroduced by Schoenberg (1959) independently. Then, many researchers have studied on this concept until recently (see ...
Lacunary statistical summability of sequences of sets
(Konuralp Journal of Mathematics, 2015)
In this paper we define the WS_θ-analog of the Cauchy criterion for convergence and show that it is equivalent to Wijsman lacunary statistical convergence. Also, Wijsman lacunary statistical convergence is compared to other ...
Asymptotically I2-Ces`aro equivalence of double sequences of sets
(Ilirias Publications, 2016)
In this paper, we defined concept of asymptotically I_2-Ces`aro equivalence and investigate the relationships between the concepts of asymptotically strongly I_2-Ces`aro equivalence, asymptotically strongly I_2-lacunary ...
An extension of asymptotically lacunary statistical equivalence set sequences
(Springer, 2014)
This paper presents, for sequences of sets ,the notions of asymptotically lacunary statistical equivalence (in the sense of Wijsman) of multiplicity L, strongly asymptotically lacunary p-equivalence (in the sense of Wijsman) ...
I-Cesàro summability of sequences of sets
(International Conference on Pure and Applied Mathematics, 2015)
In this paper, we defined concept of Wijsman I-Cesàro summability for sequences of sets and investigate the relationship between the concepts of Wijsman strongly I-Cesàro summability, Wijsman strongly I-lacunary summability, ...
On quasi-lacunary invariant convergence of sequences of sets
(International Conference on Analysis and Its Applications, 2018)
In this study, we give definitions of Wijsman quasi-lacunary invariant convergence, Wijsman strongly quasi-lacunary invariant convergence and Wijsman quasi-lacunary invariant statistically convergence for sequences of sets. ...
On invariant summability of double sequences
(International Conference on Advances in Natural and Applied Sciences, 2017)
The aim of this study is to give some invariant summability definitions for double real number sequences and investigate relationships among these concepts
I-Cesàro summability of sequences of sets
(Fractional Calculus and Application Group, 2017)
In this paper, we defined concept of Wijsman I-Cesàro summability for sequences of sets and investigate the relationships between the concepts of Wijsman strongly I-Cesàro summability, Wijsman strongly I-lacunary summability, ...
Asymptotically I-statistical equivalent functions defined on amenable semigroups
(Sigma Journal of Engineering and Natural Sciences, 2019)
In this study, we introduce the notions of asymptotically I-equivalence, asymptotically I*-equivalence, asymptotically strongly I-equivalence and asymptotically I-statistical equivalence for functions defined on discrete ...