References

1. T. J. I. Bromwich, An Introduction to the Theory of Infinite Series, Macmillan, New York, NY, USA, 1965.

2. G. H. Hardy, “On the convergence of certain multiple series,” Proceedings of the Cambridge Philosophical Society, vol. 19, pp. 86–95, 1917.

   View at: Google Scholar

3. F. Móricz, “Extensions of the spaces $c$ and $c_0$ from single to double sequences,” Acta Mathematica Hungarica, vol. 57, no. 1-2, pp. 129–136, 1991.

   View at: Publisher Site | Google Scholar | Zentralblatt MATH | MathSciNet

4. F. Móricz and B. E. Rhoades, “Almost convergence of double sequences and strong regularity of summability matrices,” Mathematical Proceedings of the Cambridge Philosophical Society, vol. 104, no. 2, pp. 283–294, 1988.

   View at: Google Scholar | Zentralblatt MATH | MathSciNet

5. M. Basarir and O. Sonalcan, “On some double sequence spaces,” Journal of the Indian Academy of Mathematics, vol. 21, no. 2, pp. 193–200, 1999.

   View at: Google Scholar | Zentralblatt MATH | MathSciNet

6. B. C. Tripathy, “Statistically convergent double sequences,” Tamkang Journal of Mathematics, vol. 34, no. 3, pp. 231–237, 2003.

   View at: Google Scholar | Zentralblatt MATH | MathSciNet

7. R. Colak and A. Turkmenoglu, “The double sequence spaces ${\ell }_{\infty }{}^2\left(p\right)$, $c_0{}^2\left(p\right)$ and $c^2\left(p\right)$,” in preparation.

   View at: Google Scholar

8. A. Turkmenoglu, “Matrix transformation between some classes of double sequences,” Journal of Institute of Mathematics & Computer Sciences, vol. 12, no. 1, pp. 23–31, 1999.

   View at: Google Scholar | Zentralblatt MATH | MathSciNet

9. T. Apostol, Mathematical Analysis, Addison-Wesley, London, UK, 1978.

10. W. Orlicz, “Über Raume $\left(L^M\right)$,” Bulletin International de l'Académie Polonaise des Sciences et des Lettres, Série A, pp. 93–107, 1936.

    View at: Google Scholar | Zentralblatt MATH

11. J. Lindenstrauss and L. Tzafriri, “On Orlicz sequence spaces,” Israel Journal of Mathematics, vol. 10, pp. 379–390, 1971.

    View at: Google Scholar | Zentralblatt MATH | MathSciNet

12. S. D. Parashar and B. Choudhary, “Sequence spaces defined by Orlicz functions,” Indian Journal of Pure and Applied Mathematics, vol. 25, no. 4, pp. 419–428, 1994.

    View at: Google Scholar | Zentralblatt MATH | MathSciNet

13. Mursaleen, M. A. Khan, and Qamaruddin, “Difference sequence spaces defined by Orlicz functions,” Demonstratio Mathematica, vol. 32, no. 1, pp. 145–150, 1999.

    View at: Google Scholar | Zentralblatt MATH | MathSciNet

14. Ç. A. Bektaş and Y. Altin, “The sequence space $l_M\left(p,q,s\right)$ on seminormed spaces,” Indian Journal of Pure and Applied Mathematics, vol. 34, no. 4, pp. 529–534, 2003.

    View at: Google Scholar | Zentralblatt MATH | MathSciNet

15. B. C. Tripathy, M. Et, and Y. Altin, “Generalized difference sequence spaces defined by Orlicz function in a locally convex space,” Journal of Analysis and Applications, vol. 1, no. 3, pp. 175–192, 2003.

    View at: Google Scholar | Zentralblatt MATH | MathSciNet

16. K. Chandrasekhara Rao and N. Subramanian, “The Orlicz space of entire sequences,” International Journal of Mathematics and Mathematical Sciences, vol. 2004, no. 68, pp. 3755–3764, 2004.

    View at: Publisher Site | Google Scholar | Zentralblatt MATH | MathSciNet

17. M. A. Krasnoselskii and Y. B. Rutickii, Convex Functions and Orlicz Spaces, Noordhoff, Gorningen, The Netherlands, 1961.

    View at: Zentralblatt MATH | MathSciNet

18. H. Nakano, “Concave modulars,” Journal of the Mathematical Society of Japan, vol. 5, no. 1, pp. 29–49, 1953.

    View at: Google Scholar | Zentralblatt MATH | MathSciNet

19. W. H. Ruckle, “FK spaces in which the sequence of coordinate vectors is bounded,” Canadian Journal of Mathematics, vol. 25, pp. 973–978, 1973.

    View at: Google Scholar | Zentralblatt MATH | MathSciNet

20. I. J. Maddox, “Sequence spaces defined by a modulus,” Mathematical Proceedings of the Cambridge Philosophical Society, vol. 100, no. 1, pp. 161–166, 1986.

    View at: Google Scholar | Zentralblatt MATH | MathSciNet