Konu "Sequences of Sets" için Matematik Bölümü listeleme
Toplam kayıt 19, listelenen: 1-19
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Asymptotically ... equivalence of double sequences of sets defined by modulus functions
(2019)Fast (1951) and Schoenberg (1959), independently, introduced the concept of statistical convergence and many authors studied this concept. Mursaleen and Edely (2003) extended this concept to the double sequences. The idea ... -
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, ... -
Asymptotically I-Invariant statistical equivalence of sequences of set defined by a modulus function
(2018)In this paper, we introduce the concepts of strongly asymptotically I-invariant equivalence, f-asymptotically I-invariant equivalence, strongly f-asymptotically I-invariant equivalence and asymptotically I-invariant ... -
Asymptotically I_σ-equivalence of sequences of sets
(International Conference on Analysis and Its Applications, 2016)In this paper, we introduce the concepts of Wijsman p-strongly asymptotically invariant equivalence ([W_{V_σ)}^L]_p), Wijsman asymptotically I-invariant equivalence (W_{I_σ}^L) and Wijsman asymptotically I^*-invariant ... -
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 ... -
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 ... -
A generalization of I-asymptotically lacunary statistical equivalence of sequences of sets
(2014)This paper presents, for sequences of sets, a generalization of the concept of I-asymptotically lacunary statistical equivalence by using the sequence p=(p_k) which is the sequence of positive real numbers where I is an ... -
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 I-convergence of sequences of functions in 2-normed spaces
(Southeast Asian Bulletin of Mathematics, 2018)In this paper, we study concepts of convergence and ideal convergence of sequence of functions and investigate relationships between them and some properties such as linearity in 2-normed spaces. Also, we prove a decomposition ... -
On Kuratowski i-convergence of sequences of closed sets
(JSTOR, 2017)In this paper we extend the concepts of statistical inner and outer limits (as introduced by Talo, Sever and Bas¸ar) to I− inner and I− outer limits and give some I− analogue of properties of statistical inner and outer ... -
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 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 ... -
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 convergence of sequences of sets
(Ilirias Publications, 2017)In this paper, we defined concepts of Wijsman quasi-almost convergence and Wijsman quasi-almost statistically convergence. Also we give the concepts of Wijsman quasi-strongly almost convergence and Wijsman quasi q-strongly ... -
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 ... -
Strongly I_2-lacunary convergence and I_2-lacunary cauchy double sequences of sets
(2015)In this paper, we study the concepts of Wijsman strongly I2-lacunary convergence, Wijsman strongly I*_2 -lacunary convergence, Wijsman strongly I2-lacunary Cauchy sequences and Wijsman strongly I*_2 -lacunary Cauchy double ... -
Wijsman I-invariant convergence of sequences of sets
(2016)In this paper, we study the concepts of Wijsman I-invariant convergence (I^W_sihma ), Wijsman I*-invariant convergence (I*W_sigma ), Wijsman p-strongly invariant convergence ([WV_sigma]_p) of sequences of sets and investigate ... -
Wijsman I_2-invariant convergence of double sequences of sets
(2016)In this paper, we study the concepts of Wijsman invariant convergence, Wijsmacn invariant statistical onvergence, Wijsman I2-invariant convergence (I^sigma_W_2), Wijsman I*_2 -invariant convergence (I*^sigma_W_2 ), Wijsman ... -
Wijsman quasi-invariant convergence
(International Conference on Mathematical and Related Sciences, 2018)In this study, we defined the concepts of Wijsman quasi-invariant convergence, Wijsman quasi-strongly invariant convergence and Wijsman quasi q-strongly invariant convergence. Also, we give the concept of Wijsman quasi-invariant ...