Ara
Toplam kayıt 8, listelenen: 1-8
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. ...
Asymptotically lacunary I_σ-equivalence of sequences of sets
(2018)
In this study, we introduce the concepts of Wijsman p-strongly asymptotically lacunary invariant equivalence ([W_{N_{θσ}}^L ]_p), Wijsman asymptotically lacunary I-invariant equivalence (W_{I_{σθ}}^L) and Wijsman asymptotically ...
On Strongly I and I-Lacunary convergence of sequences of sets
(2014)
In this paper we study the concepts of Wijsman strongly lacunary convergence, Wijsman strongly I-lacunary convergence, Wijsman strongly I*-lacunary convergence and Wijsman strongly I-lacunary Cauchy sequences of sets and ...
Asymptotically I-Cesàro equivalence of sequences of sets
(Emrah Evren KARA, 2018)
In this paper, we defined concepts of asymptotically I-Cesàro equivalence and investigate the relationships between the concepts of asymptotically strongly I-Cesàro equivalence, asymptotically strongly I-lacunary equivalence, ...
On strongly I-Lacunary Cauchy sequences of sets
(2014)
In this study, we examinate the ideas of Wijsman strongly lacunary
Cauchy, Wijsman strongly I-lacunary Cauchy and Wijsman strongly I∗-lacunary
Cauchy sequences of sets and investigate the relationship between them.
Quasi-almost lacunary statistical convergence of sequences of sets
(EtaMaths Publishing, 2018)
In this study, we defined concepts of Wijsman quasi-almost lacunary convergence, Wijsman quasi-strongly almost lacunary convergence and Wijsman quasi q-strongly almost lacunary convergence. Also we give the concept of Wijsman ...
A generalization of asymptotically I-lacunary statistical equivalence of sequences of sets
(Mathematical Sciences and Applications E-Notes, 2016)
This paper presents, for sequences of sets, generalize the concepts of Wijsman asymptotically strongly I-lacunary equivalence and Wijsman asymptotically strongly I-Cesàro equivalence by using p=(p_k) which is the sequence ...
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, ...