On some spaces of Lacunary I-convergent sequences of interval numbers defined by sequence of moduli

Mohd Shafiq, Ayhan Esi

Resumen



Palabras clave


Interval numbers ; Ideal ; Filter, ; I-convergent sequence ; Solid and monotone space ; Banach space ; Modulus function.

Texto completo:

PDF

Referencias


ESI, A. (2012) A new class of interval numbers. EN: Journal of Qafqaz University, Mathematics and Computer Science. [s.l.: s.n.], 98-102.

ESI, A. (2012) Lacunary sequence spaces of interval numbers. EN: Thai Journal of Mathemaatics, 10 (2). [s.l.: s.n.], 445-451.

ESI, A. (2012) Double lacunary sequence spaces of double Sequence of interval numbers. EN: Proyecciones Journal of Mathematics, 31 (1). [s.l.: s.n.], 297-306.

ESI, A. (2011) Strongly almost -convergence and statistically almost -convergence of interval numbers. EN: Scientia Magna, 7 (2). [s.l.: s.n.], 117-122.

ESI, A. (2014) Statistical and lacunary statistical convergence of interval numbers in topological groups. EN: Acta Scientarium Technology. [s.l.: s.n.].

ESI, A. (2013) On asymptotically -statistical equivalent sequences of interval numbers. EN: Acta Scientarium Technology, 35 (3). [s.l.: s.n.], 515-520

ESI, A. (2013) Asymptotically lacunary statistically equivalent sequences of interval numbers, International Journal of Mathematics and Its Applications, 1(1). [s.l.: s.n.], 43-48.

ESI, A. (2013) Some I-convergent of double Λ-interval sequences defined by Orlicz function., Global, J. of Mathematical Analysis, 1 (3). [s.l.: s.n.], 110-116.

ESI, A. (2014) λ-Sequence Spaces of Interval Numbers. EN: Appl. Math. Inf. Sci. 8(3). [s.l.: s.n.], 1099-1102.

BUCK, R. C. (1953) Generalized asymptotic density,Amer. EN: J. Math. 75. [s.l.: s.n.], 335-346.

CHIAO, K. P. (2002) Fundamental properties of interval vector max-norm. EN: Tamsui Oxford Journal of Mathematical Sciences, 18(2). [s.l.: s.n.], 219-233.

DWYER, P. S. (1951) Linear Computation. New York: Wiley.

FAST, H. (1951) Sur la convergence statistique. EN: Colloq. Math. 2. [s.l.: s.n.], 241-244.

FREEDMAN, A. R.(1978) Sember,J.J.and Raphael,M.,Some Cesaro type summability spaces. EN: Proc. London Math. Soc., 37. [s.l.: s.n.], 508-520.

FRIDY, J. A. (1985) On statistical convergence. EN: Analysis, 5. [s.l.: s.n.], 301-313.

KHAN, V. A. (2014) Mohd Shafiq and Ebadullah, K., On paranorm Iconvergent sequence spaces of interval numbers. EN: J. of Nonlinear Analysis and Optimisation (Theory and Application), 5(1). [s.l.: s.n.], 103-114.

] KHAN, V. A. (2014) On paranorm BVσ Iconvergent sequence spaces defined by an Orlicz function. EN: Global Journal of mathematical Analysis, 2 (2). [s.l.: s.n.], 28-43.

KOLK, E. (1993) On strong boundedness and summability with respect to a sequence of moduli. EN: Acta Comment.Univ.Tartu., 960. [s.l.: s.n.], 41-50.

KOLK, E. (1994) Inclusion theorems for some sequence spaces defined by a sequence of moduli. EN: Acta Comment.Univ. Tartu., 970. [s.l.: s.n.], 65-72.

KOSTYRKO, P. (20??) Statistical convergence and Iconvergence.Real Analysis Exchange.

KOSTYRKO, P. (2000) I-convergence,Raal Analysis. EN: Analysis Exchange. 26(2). [s.l.: s.n.], 669-686.

MOORE, R. E. (1959) Automatic Error Analysis in Digital Computation, LSMD-48421, Lockheed Missiles and Space Company. [s.l.: s.n.].

MOORE, R. E. (1959) Interval Analysis I, LMSD-285875, Lockheed Missiles and Space Company, Palo Alto, Calif. [s.l.: s.n.].

MURSALEEN, M. (2010) On the Spaces of λ-Convergent and Bounded Sequences. EN: Thai Journal of Mathematics 8(2). [s.l.: s.n.], 311-329.

MURSALEEN, M. (2014) Spaces of Ideal Convergent sequences. Article ID 134534, 6 pages. [s.l.: s.n.]. http://dx.doiorg/10.1155/2014/134534.

NAKANO, H. (1953) Concave modulars. EN: J. Math Soc. Japan, 5. [s.l.: s.n.], 29-49.

RUCKLE, W. H. (1968) On perfect Symmetric BK-spaces. EN: Math. Ann. 175. [s.l.: s.n.], 121-126.

RUCKLE, W. H. (1967) Symmetric coordinate spaces and symmetric bases. EN: Canad. J. Math. 19. [s.l.: s.n.], 828-838.

RUCKLE, W. H. (1973) FK-spaces in which the sequence of coordinate vectors is bounded. EN: Canad. J. Math. 25 (5). [s.l.: s.n.], 973-975.

SALÁT, T. (1980) On statistical convergent sequences of real numbers. En: Math, Slovaca 30. [s.l.: s.n.].

SALÁT, T. (2004) On some properties of Iconvergence Tatra Mt. EN: Math. Publ. 28. [s.l.: s.n.], 279-286.

SALÁT, T. (2005) On I-convergence field. EN: Ital. J. Pure Appl. Math. 17. [s.l.: s.n.], 45-54.

SCHOENBERG, I. J. (1959) The integrability of certain functions and related summability methods. EN: Amer. Math. Monthly, 66. [s.l.: s.n.], 361-375.

SENGÖNÜL, M. (2010) On the Sequence Spaces of Interval Numbers. EN: Thai J. of Mathematics, 8(3). [s.l.: s.n.], 503-510.

TRIPATHY, B. C. (1998) On statistical convergence. EN: Proc. Estonian Acad. Sci. Phy. Math. Analysis. [s.l.: s.n.], 299-303.

TRIPATHY, B. C. (2009) Paranorm I-convergent sequence spaces. EN: Math. Slovaca 59 (4). [s.l.: s.n.], 485-494.


Enlaces refback

  • No hay ningún enlace refback.