On $\left( p,q\right) $-analog of Stancu operators of rough $\lambda$- statistically $\rho$-Cauchy convergence of triple sequence spaces
On $\left( p,q\right) $-analog of Stancu operators of rough $\lambda$- statistically $\rho$-Cauchy convergence of triple sequence spaces
In this work, using the concept of natural density, we introduce the $\left(
p,q\right) $-analogue of the Stancu-beta operators of rough $\lambda$%
-statistically $\rho$-Cauchy convergence on triple sequence spaces. We define
the set of Bernstein Stancu beta opeators of rough statistical limit points of
a triple sequence spaces and obtain to $\lambda-$statistical convergence
criteria associated with this set. Also, we examine the relations between the
set of Bernstein-Stancu beta operators of rough $\lambda$-statistically
$\rho$-Cauchy convergence of triple sequences.
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- S. Aytar, Rough statistical convergence, Numerical Functional
Analysis Optimization \textbf{29(3)} (2008) 291-303.
- A. Esi, On some triple almost lacunary sequence spaces defined
by Orlicz functions, Research and Reviews: Discrete Mathematical Structures
\textbf{1(2)} (2014) 16-25.
- A. Esi and M. Necdet Catalbas, Almost convergence of triple
sequences, Global Journal of Mathematical Analysis \textbf{2(1)} (2014) 6-10.
- A. Esi and E. Savas, On lacunary statistically convergent
triple sequences in probabilistic normed space, Appl. Math. and Inf. Sci.
\textbf{9(5)} (2015) 2529-2534.
- A. Esi, S. Araci and M. Acikgoz, Statistical convergence of
Bernstein operators, Appl. Math. and Inf. Sci. \textbf{10(6)} (2016) 2083-2086.
- A. J. Dutta, A. Esi and B. C. Tripathy, Statistically
convergent triple sequence spaces defined by Orlicz function, Journal of
Mathematical Analysis \textbf{4(2)} (2013) 16-22.
- A. Esi, S. Araci and Ayten Esi, $\lambda$-statistical
convergence of Bernstein polynomial sequences, Advances and Applications in
Mathematical Sciences \textbf{16(3)} (2017) 113-119.
- A. Esi, N. Subramanian and Ayten Esi, On triple sequence space
of Bernstein operator of rough $I_{\lambda}$-convergence pre-Cauchy sequences,
Proyecciones Journal of Mathematics \textbf{36(4)} (2017) 567-587.
- S. Debnath, B. Sarma and B. C. Das, Some generalized triple
sequence spaces of real numbers, Journal of Nonlinear Analysis and
Optimization \textbf{6(1)} (2015) 71-79.
- S. K. Pal, D. Chandra and S. Dutta, Rough ideal convergence,
Hacettepe Journal Mathematics and Statistics \textbf{42(6)} (2013) 633-640.
- H. X. Phu, Rough convergence in normed linear spaces, Numerical
Functional Analysis Optimization \textbf{22} (2001) 201-224.
- A. Sahiner, M. Gurdal and F. K. Duden, Triple sequences and
their statistical convergence, Selcuk J. Appl. Math. \textbf{8(2)} (2007) 49-55.
- A. Sahiner, B. C. Tripathy, Some $I$-related properties of
triple sequences, Selcuk J. Appl. Math. \textbf{9(2)} (2008) 9-18.
- N. Subramanian and A. Esi, The generalized tripled
difference of $\chi^{3}$ sequence spaces, Global Journal of Mathematical
Analysis \textbf{3(2)} (2015) 54-60.