BibTex RIS Kaynak Göster

The Rate of $\chi$-space Defined by a Modulus

Yıl 2014, Cilt: 2 Sayı: 2, 78 - 86, 01.08.2014

Nagarajan Subramanian Periyanan Thirunavukkarasu Raman Babu

Öz

In this paper we introduce the modulus function of characterize the duals of the . We establish some inclusion relations, topological results and we sequence spaces

Kaynakça

  • [3] [4] [5] [6] [7] [8] [9] [10] Nakano, Concave modulus, J. Math. Soc. Japan, 5(1953), 29-49.
  • W. Orlicz, Über Raume (
  • W.H. Ruckle, FK Spaces in which the sequence of coordinate vector is bounded, Canada, J. Math., 25 (1973), 973-978.
  • S.M. Sirajindeen, Matrix transformation of 0( ), ∞( ), and into , Indian J. Pure Appl. Math., 12(9) (1981), 1106-1113.
  • S. Sridhar, A matrix transformation between some sequence Spaces, Acta Ciencia Indica, 5(1979), 194-197.
  • B.C. Tripathy, M. Et and Y. Altin, Generalized difference sequence spaces defined by Orlicz function in a locally convex space, J. Analysis and Applications, 1(3) (2003), 175-192.
  • A. Wilansky, Summability through functional analysis, North Holland, Mathematical Studies, North-Holland Publishing, Amsterdam,Vol. 85(1984).

The rate of -space defined by a modulus

Yıl 2014, Cilt: 2 Sayı: 2, 78 - 86, 01.08.2014

Nagarajan Subramanian Periyanan Thirunavukkarasu Raman Babu

Öz

Kaynakça

  • [3] [4] [5] [6] [7] [8] [9] [10] Nakano, Concave modulus, J. Math. Soc. Japan, 5(1953), 29-49.
  • W. Orlicz, Über Raume (
  • W.H. Ruckle, FK Spaces in which the sequence of coordinate vector is bounded, Canada, J. Math., 25 (1973), 973-978.
  • S.M. Sirajindeen, Matrix transformation of 0( ), ∞( ), and into , Indian J. Pure Appl. Math., 12(9) (1981), 1106-1113.
  • S. Sridhar, A matrix transformation between some sequence Spaces, Acta Ciencia Indica, 5(1979), 194-197.
  • B.C. Tripathy, M. Et and Y. Altin, Generalized difference sequence spaces defined by Orlicz function in a locally convex space, J. Analysis and Applications, 1(3) (2003), 175-192.
  • A. Wilansky, Summability through functional analysis, North Holland, Mathematical Studies, North-Holland Publishing, Amsterdam,Vol. 85(1984).
Toplam 7 adet kaynakça vardır.

Ayrıntılar

Bölüm Articles
Yazarlar

Nagarajan Subramanian Bu kişi benim

Periyanan Thirunavukkarasu Bu kişi benim

Raman Babu Bu kişi benim

Yayımlanma Tarihi 1 Ağustos 2014
Yayımlandığı Sayı Yıl 2014 Cilt: 2 Sayı: 2

Kaynak Göster

APA Subramanian, N., Thirunavukkarasu, P., & Babu, R. (2014). The rate of -space defined by a modulus. New Trends in Mathematical Sciences, 2(2), 78-86.
AMA Subramanian N, Thirunavukkarasu P, Babu R. The rate of -space defined by a modulus. New Trends in Mathematical Sciences. Ağustos 2014;2(2):78-86.
Chicago Subramanian, Nagarajan, Periyanan Thirunavukkarasu, ve Raman Babu. “The Rate of -Space Defined by a Modulus”. New Trends in Mathematical Sciences 2, sy. 2 (Ağustos 2014): 78-86.
EndNote Subramanian N, Thirunavukkarasu P, Babu R (01 Ağustos 2014) The rate of -space defined by a modulus. New Trends in Mathematical Sciences 2 2 78–86.
IEEE N. Subramanian, P. Thirunavukkarasu, ve R. Babu, “The rate of -space defined by a modulus”, New Trends in Mathematical Sciences, c. 2, sy. 2, ss. 78–86, 2014.
ISNAD Subramanian, Nagarajan vd. “The Rate of -Space Defined by a Modulus”. New Trends in Mathematical Sciences 2/2 (Ağustos 2014), 78-86.
JAMA Subramanian N, Thirunavukkarasu P, Babu R. The rate of -space defined by a modulus. New Trends in Mathematical Sciences. 2014;2:78–86.
MLA Subramanian, Nagarajan vd. “The Rate of -Space Defined by a Modulus”. New Trends in Mathematical Sciences, c. 2, sy. 2, 2014, ss. 78-86.
Vancouver Subramanian N, Thirunavukkarasu P, Babu R. The rate of -space defined by a modulus. New Trends in Mathematical Sciences. 2014;2(2):78-86.