Generalized statistical convergence and statistical core of double sequences

“…have shown their interest to study double sequences and related convergence problems. Mursaleen and Edely [15] and Mursaleen et al [14] respectively extended Definition 1.1 and Definition 1.2 on double sequences and obtained some analogous results. However, Çolak and Altin [4] introduced statistical convergence of orderα for these kind of sequences.…”

“…We begin with the following definition: Let Sα (λ,µ) (x) denotes the set of all (λ, µ)−statistically convergent double sequences of orderα. Forα = (a, b) = (1, 1), Definition 2.1 coincides with (λ, µ)−statistical convergence of double sequences of [14]. For the choice λ = (n) and µ = (m), Definition 2.1 coincides with statistical convergence of double sequences of orderα of [3].…”

“…Let x = (x ij ) and y = (y ij ) be two double sequences of complex numbers andα ∈ (0, 1]. [14]. For λ = (n) and µ = (m), Definition 2.5 coincides with strong p-Cesàro summability of double sequences of orderα of [3].…”

Some remarks on statistical summability of order $\tilde{\alpha}$ defined by generalized De la Vall\'{e}e-Pousin Mean

“…have shown their interest to study double sequences and related convergence problems. Mursaleen and Edely [15] and Mursaleen et al [14] respectively extended Definition 1.1 and Definition 1.2 on double sequences and obtained some analogous results. However, Çolak and Altin [4] introduced statistical convergence of orderα for these kind of sequences.…”

“…We begin with the following definition: Let Sα (λ,µ) (x) denotes the set of all (λ, µ)−statistically convergent double sequences of orderα. Forα = (a, b) = (1, 1), Definition 2.1 coincides with (λ, µ)−statistical convergence of double sequences of [14]. For the choice λ = (n) and µ = (m), Definition 2.1 coincides with statistical convergence of double sequences of orderα of [3].…”

“…Let x = (x ij ) and y = (y ij ) be two double sequences of complex numbers andα ∈ (0, 1]. [14]. For λ = (n) and µ = (m), Definition 2.5 coincides with strong p-Cesàro summability of double sequences of orderα of [3].…”

Some remarks on statistical summability of order $\tilde{\alpha}$ defined by generalized De la Vall\'{e}e-Pousin Mean

“…The concept of statistical convergence was introduced by Fast [5] and Steinhaus [23] and then reintroduced by Schoenberg [20] independently. Over the years, statistical convergence has been developed in [3,6,7,12,16,17,24] and turned out very useful to resolve many convergence problems arising in Analysis.…”

On $\Lambda$-statistical convergence of order $\alpha$ in random 2-normed space

“…The concept of statistical convergence for sequences of real numbers was introduced by Fast [4] and Steinhaus [22] independently in the same year 1951 and since then several generalizations and applications of this notion have been investigated by various authors, namely [3], [7], [15], [16], [17], [18], [19]. One of its interesting generalization is I-convergence which was given by Kostyrko et al [12].…”

On ideal convergence in probabilistic normed spaces