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Abstrakty
Let χ2 denote the space of all prime sense double gai sequences and Λ2 the space of all prime sense double analytic sequences. This paper is devoted to the general properties of χ2.
Czasopismo
Rocznik
Tom
Strony
95--111
Opis fizyczny
Bibliogr. 45 poz.
Twórcy
autor
- Department of Mathematics, SASTRA University, Thanjavur-613 401, India.
autor
- Department of Mathematics, SASTRA University, Thanjavur-613 401, India.
Bibliografia
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- [25] M.Gupta and P.K.Kamthan, Infinite Matrices and tensorial transformations, Acta Math. Vietnam 5, (1980), 33-42.
- [26] N.Subramanian, R.Nallswamy and N.Saivaraju, Characterization of entire sequences via double Orlicz space, Internaional Journal of Mathematics and Mathemaical Sciences, Vol.2007(2007), Article ID 59681, 10 pages.
- [27] A.Gökhan and R.Colak, The double sequence spaces cP2(p) and cPB2(p), Appl. Math. Comput., 157(2), (2004), 491-501.
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- [29] M.Zeltser, Investigation of Double Sequence Spaces by Soft and Hard Analitical Methods, Dissertationes Mathematicae Universitatis Tartuensis 25, Tartu University Press, Univ. of Tartu, Faculty of Mathematics and Computer Science, Tartu, 2001.
- [30] M.Mursaleen and O.H.H. Edely, Statistical convergence of double sequences, J.Math. Anal. Appl., 288(1), (2003), 223-231.
- [31] M.Mursaleen, Almost strongly regular matrices and a core theorem for double sequences, J. Math. Anal. Appl., 293(2), (2004), 523-531.
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- [35] N.Subramanian and U.K.Misra, The semi normed space defined by a double gai sequence of modulus function, Fasciculi Math., 46, (2010).
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- [37] N.Subramanian and U.K.Misra, Characterization of gai sequences via double Orlicz space, Southeast Asian Bulletin of Mathematics, (revised).
- [38] N.Subramanian, B.C.Tripathy and C.Murugesan, The double sequence space of Γ2, Fasciculi Math., 40, (2008), 91-103.
- [39] N.Subramanian, B.C.Tripathy and C.Murugesan, The Cesáro of double entire sequences, International Mathematical Forum, 4 no.2(2009), 49-59.
- [40] N.Subramanian and U.K.Misra, The Generalized double of gai sequence spaces, Fasciculi Math., 43, (2010).
- [41] N.Subramanian and U.K.Misra, Tensorial transformations of double gai sequence spaces, International Journal of Computational and Mathematical Sciences, 3:4, (2009), 186-188.
- [42] Erwin Kreyszig, Introductory Functional Analysis with Applications, by John Wiley and Sons Inc. , 1978.
- [43] M.Mursaleen and S.A.Mohiuddine, Regularly σ-conservative and σ-coercive four dimensional matrices, Computers and Mathematics with Applications, 56(2008), 1580-1586.
- [44] M.Mursaleen and S.A.Mohiuddine, On σ-conservative and boundedly σ-conservative four dimensional matrices, Computers and Mathematics with Applications, 59(2010), 880-885.
- [45] M.Mursaleen and S.A.Mohiuddine, Double σ-multiplicative matrices, J. Math. Anal. Appl., 327(2007), 991-996.
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Bibliografia
Identyfikator YADDA
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