DUAL- , DUAL- DAN DUAL- DARI RUANG BARISAN CS
-
Albert Kumanereng(1)
universitas nusa cendana
-
Ariyanto *(2)
-
Rapmaida *(3)
universitas nusa cendana
(*) Corresponding Author
Keywords:
Banach Space, Sequence space cs, Dual-α, Dual-β, Dual-γ, Convergen Series
Abstract
This research discussed about The Sequence Space cs. The sequence space cs is a set of all convergent series. A series is said to convergent if the partial sums of the series is convergent. A sequence is said to convergent if for came near to infinity, the terms of the sequence came near to a value.The method in this research is literature review.The results are: dual- of is , dual- of is , dual- of is and is -perfect sequence space.
Downloads
Download data is not yet available.
References
[1] Bartle, Robert & Sherbert, Donald. 2000. Introduction to Real Analysis. John Wiley and Sons.Inc.
[2] Berberian, Sterling. 1961. Introduction to Hilbert Space. Oxford University Press.
[3] Bonar, Daniel & Khoury, Michael. 2006. Real Infinite Series. Mathematical Association of America.
[3] Boos, Johan. 2001. Classical and Modern Methods in Summability. USA : Oxford University Press.
[4 ]Bromwich, Thomas. 1965. Introduction to the Theory of Infinite Series. New York : MacMillan
[5] Darmawijaya, Suparna. 1998. Pengantar Analisis. Yogyakarta: Percetakan UGM
[6] Kreizig, Erwin. 1978. Introductory Functional Analysis with Applications. USA: John Wiley and Sons. Inc.
[7] Mauch, Sean. 2003. Introduction to Methods of Applied Mathematics or Advanced Mathematical Methods for Scientists and Engineers. Mauch Publishing Company.
[8] Mursaleen, josef & Banas. 2014. M-Sequence Spaces and Measures of Noncompactness with Applications to Differential and Integral Equations.Springer. Peng Yee, Lee. 1989. Zeller Theory and Classical Sequence Spaces
[2] Berberian, Sterling. 1961. Introduction to Hilbert Space. Oxford University Press.
[3] Bonar, Daniel & Khoury, Michael. 2006. Real Infinite Series. Mathematical Association of America.
[3] Boos, Johan. 2001. Classical and Modern Methods in Summability. USA : Oxford University Press.
[4 ]Bromwich, Thomas. 1965. Introduction to the Theory of Infinite Series. New York : MacMillan
[5] Darmawijaya, Suparna. 1998. Pengantar Analisis. Yogyakarta: Percetakan UGM
[6] Kreizig, Erwin. 1978. Introductory Functional Analysis with Applications. USA: John Wiley and Sons. Inc.
[7] Mauch, Sean. 2003. Introduction to Methods of Applied Mathematics or Advanced Mathematical Methods for Scientists and Engineers. Mauch Publishing Company.
[8] Mursaleen, josef & Banas. 2014. M-Sequence Spaces and Measures of Noncompactness with Applications to Differential and Integral Equations.Springer. Peng Yee, Lee. 1989. Zeller Theory and Classical Sequence Spaces
Published
2016-04-30
How to Cite
Kumanereng, A., *, A., & *, R. (2016). DUAL- , DUAL- DAN DUAL- DARI RUANG BARISAN CS. Jurnal MIPA - Penelitian Dan Pengembangan (JMIPA), 20(1), 17-30. Retrieved from https://ejurnal.undana.ac.id/index.php/MIPA/article/view/689
Section
Articles
