___

• Ahmad,Z.U., and Mursaleen,M.(1988), “An application of Banach limits,” Proc.Amer. Math. soc 103(1), 244-246. Banach,S.(1986), “Theorie des operations lineaires,” Warszawa, (1932)103, 244-246.
• Fast,H.(1951), “Sur la convergence statistique,” Colloq. Math. 2, 241-244.
• Fridy,J.A.(1985), “On statistical convergence,” Analysis. 5, 301-313.
• Gramsch,B.(1967), “Die Klasse metrisher linearer Raume L(Á),” Math. Ann. 171, 61-78.
• Habil, E.D., 2006, “Double sequences and double series,” The Islamic University Journal,Series of Natural Studies and Engineering, vol. 14, pp, 1-33.
• Hazarika, B., Karan, T. and Singh,B.K. (2014), “Zweier Ideal convergent sequence space defined by Orlicz function,” Journal of mathematics and com- puter science 8, 307-318
• Khan,V.A.(2008), “On a new sequence space defined by Orlicz function,” Communications de la Faculté des Sciences de l'Université d'Ankara SériesA1.57, 25-33.
• Khan, V. A. and Ebadullah, K. (2013), “On some new convergent sequence space,” Mathematics, Aeterna 3(2)151-159.
• Khan, V. A. and Ebadullah, K. (2012), “On a new I-convergent sequence space,” Analysis 32, 199-208.
• Khan, V.A., Fatima, H., Abdullaha, S.A.A., Khan, M.D. (2016), “On a New BVσ-I-Convergent Double Sequence Spaces,” Theory and Application of mathematics and computer science 6 (2), 187-197.
• Khan,V.A., Ebadullah,K.(2012), “I-convergent sequences spaces defined by sequence of moduli,” Journal of Mathematical and Computational Science 2 (2), 265-273.
• Khan, V.A, Esi, A. and Shafiq, M.(2014) , “On some BV_σ I-convergent sequence spaces Defined by modulus function ,” Global Journal of Mathematical Analysis, 2(2) 17-27.
• King, J.P.(1966), “Almost summable Sequences,” Proc.Amer. Math. soc.17, 1219-1225.
• Kayaduman, K., and Sengönül, M. (2014), “Some New Type Sigma Convergent Sequence Spaces and Some New Inequalities,” Scientific world journal 589765.
• Kostyrko,P. ,Ŝalát, T. and Wilczyński,W.(2000), “I convergence,” Real Analysis Exchange. 26(2), 669-686.
• Kostyrko,P.,Mańaj, M. and Salát,T., “Statistical convergence and I-convergence,” Real Analysis Exchange.
• KÄothe, G. (1970) , “Topological Vector spaces.1.” Springer, Berlin.
• Lorentz, G.G. (1948), “A contribution to the theory of divergent series,” Acta Math, 80, 167-190.
• Mursaleen, M.(1983), “On some new invariant matrix methods of summability,” The Quart. J. Math., 34(133), 77-86.
• Mursaleen, M.(1983), “Matrix transformation between some new sequence spaces,” Houston J. Math.9, 505-509.
• Maddox, I.J.(1970), “Elements of Functional Analysis,” Cambridge University Press.
• Maddox, I.J.(1968), “Paranormed sequence spaces generated by infinite matrices,” Math. Proc. Cambridge Philos. Soc. 64,335340.
• Maddox, I.J.(1986), “Sequence spaces defined by a modulus,” Math. Camb. Phil. Soc.100, 161-166.
• Nakano, H.(1951), “Modular sequence spaces.” Proc. Jpn. Acad. Ser. A Math. Sci. 27, 508512.
• Raimi, R.A.(1963), “Invariant means and invariant matrix methods of summability,” Duke J. Math.30, 81-94.
• Ruckle, W.H.(1968), “On perfect Symmetric BK-spaces”, Math.Ann. 175, 121-126.
• Ruckle, W.H.(1967), “Symmetric coordinate spaces and symmetric bases”, Canad.J.Math. 19, 828-838.
• Ruckle, W.H.(1973), “FK-spaces in which the sequence of coordinate vectors is bounded,” Canad.J. Math.25 (5) 973-975.
• Saláat, T., Tripathy, B.C. and Ziman, M. (2004), “On some properties of I-convergence,” Tatra Mt. Math. Publ. 28, 279-286.
• Salát, T., Tripathy, B.C and Ziman, M.(2005) , “On I-convergence field,” Ital. J. Pure Appl. Math. 17, 45-54.
• Tripathy, B.C and Hazarika, B.(2009), “Paranorm I-convergent sequence spaces,” Math. Slovaca. 59(4), 485-494.
• Tripathy, B.C., Hazarika, B.(2008), “I-convergent sequence spaces associated with multiplier sequences,” Math. Ineq. Appl. 11(3), 543548.
• Tripathy,B.C and Hazarika,B.(2011), “Some I-Convergent sequence spaces defined by Orlicz function,” Acta Mathematicae Applicatae Sinica.27(1),149-154.