The best approximation of metric space of defined by

Cilt: 2 Sayı: 1 1 Nisan 2014
  • N. Subramanian
  • N. Saivaraju
  • S. Velmurugan
New Trends in Mathematical Sciences Kapak
New Trends in Mathematical Sciences
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The best approximation of $P-$ metric space of $\chi^{2}-$ defined by Musielak

Öz

In this paper, we introduce the idea of constructing sequence space Musielak and also construct some general topological properties of approximation of of best approximation in metric defined by

Anahtar Kelimeler

Kaynakça

  1. B.Altay and F.Başar, Some new spaces of double sequences, F.Başar and Y.Sever, The space M.Basarir and O.Solancan, On some double sequence spaces, J.Indian Acad. Math., 21(2) (1999), 193-200.
  2. T.J.I’ A.Bromwich, An introduction to the theory of infinite series Macmillan and Co.Ltd., New York,(1965).
  3. J.Cannor, On strong matrix summability with respect to amodul us and statistical convergence, Canad. Math. Bull., 32(2), (1989),194-198
  4. A.Gökhan and R.Çolak, The double sequence spaces ( ) and A.Gökhan and R.Çolak, Double sequence spaces G.H.Hardy, On the convergence of certain multiple series, Proc. Camb. Phil. Soc.,19(1917),8695.
  5. H.J.Hamilton, Transformations of multiple sequences, DukeMath.J.,2,(1936),29-60.
  6. J.Math. Anal. Appl., 309(1), (2005), 70-90. of double sequences ,Math. J. Okayama Univ, 51, (2009), 149157.
  7. ( ) , Appl. Math.Comput., 157(2),(2004),491-501. , 160(1),(2005),147-153. ------, A Generalization of multiple sequences transformation, DukeMath.J.,4,(1938),343358. ------, Preservation of partial Limits in Multiple sequence transformations, DukeMath.J., 4,(1939),293-297
  8. P.K.Kamthan and M.Gupta, Sequence spaces and series, Lecture notes,Pure and Applied Mathematics, 65 Marcel Dekker,Inc.,NewYork,1981.

Ayrıntılar

Birincil Dil

Türkçe

Konular

-

Bölüm

-

Yazarlar

N. Subramanian Bu kişi benim

N. Saivaraju Bu kişi benim

S. Velmurugan Bu kişi benim

Yayımlanma Tarihi

1 Nisan 2014

Gönderilme Tarihi

13 Mart 2015

Kabul Tarihi

-

Yayımlandığı Sayı

Yıl 2014 Cilt: 2 Sayı: 1

IZ

https://izlik.org/JA92CM25CK

Kaynak Göster

RIS / Bibtex
APA
Subramanian, N., Saivaraju, N., & Velmurugan, S. (2014). The best approximation of metric space of defined by. New Trends in Mathematical Sciences, 2(1), 23-34. https://izlik.org/JA92CM25CK
AMA
1.Subramanian N, Saivaraju N, Velmurugan S. The best approximation of metric space of defined by. New Trends in Mathematical Sciences. 2014;2(1):23-34. https://izlik.org/JA92CM25CK
Chicago
Subramanian, N., N. Saivaraju, ve S. Velmurugan. 2014. “The best approximation of metric space of defined by”. New Trends in Mathematical Sciences 2 (1): 23-34. https://izlik.org/JA92CM25CK.
EndNote
Subramanian N, Saivaraju N, Velmurugan S (01 Nisan 2014) The best approximation of metric space of defined by. New Trends in Mathematical Sciences 2 1 23–34.
IEEE
[1]N. Subramanian, N. Saivaraju, ve S. Velmurugan, “The best approximation of metric space of defined by”, New Trends in Mathematical Sciences, c. 2, sy 1, ss. 23–34, Nis. 2014, [çevrimiçi]. Erişim adresi: https://izlik.org/JA92CM25CK
ISNAD
Subramanian, N. - Saivaraju, N. - Velmurugan, S. “The best approximation of metric space of defined by”. New Trends in Mathematical Sciences 2/1 (01 Nisan 2014): 23-34. https://izlik.org/JA92CM25CK.
JAMA
1.Subramanian N, Saivaraju N, Velmurugan S. The best approximation of metric space of defined by. New Trends in Mathematical Sciences. 2014;2:23–34.
MLA
Subramanian, N., vd. “The best approximation of metric space of defined by”. New Trends in Mathematical Sciences, c. 2, sy 1, Nisan 2014, ss. 23-34, https://izlik.org/JA92CM25CK.
Vancouver
1.N. Subramanian, N. Saivaraju, S. Velmurugan. The best approximation of metric space of defined by. New Trends in Mathematical Sciences [Internet]. 01 Nisan 2014;2(1):23-34. Erişim adresi: https://izlik.org/JA92CM25CK