New Banach Sequence Spaces That Is Defined By The Aid Of Lucas Numbers

Bu makalede, Lucas sayılarını kullanarak yeni bir matris oluşturuyoruz ve yeni bir dizi uzayı tanımlıyoruz. Ayrıca bu uzay için bazı kapsama bağıntıları veriyoruz ve uzayın p tipi Banach-Saks, zayıf sabit nokta gibi geometrik özelliklerini araştırıyoruz.

Lucas Sayıları Yardımıyla Tanımlanan Yeni Banach Dizi Uzayları

In this work, we establish a new matrix by using Lucas numbers and define a new sequence space. Besides, we give some inclusion relations and investigate the geometrical properties such as Banach-Saks type , weak fixed point property for this space.

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Altay B, Başar F, 2005. Some Euler sequence spaces of nonabsolute type. Ukrainian Math. J, 57: 1-17.
Altay B, Başar F, 2007. The fine spectrum and the matrix domain of the difference operator Δ on the sequence space , . Commun. Math. Anal., 2: 1-11.
Altay B, Başar F, Mursaleen M, 2006. On the Euler sequence spaces which include the spaces and I, Inform. Sci, 176: 1450-1462.
Başar F, Altay B, 2003. On the space of sequences of -bounded variation and related matrix mappings. Ukrainian Math. J, 55: 136-147.
Çolak R, Et M, Malkowsky E, 2004. Some topics of sequence spaces, Lecture notes in Mathematics. Fırat Univ. Press, 1-63.
Et M, 1993. On some difference sequence spaces. Doğa Mat., 17: 18-24.
Et M, Başarır M, 1997. On some new generalized difference sequence spaces. Period. Math. Hungar., 35: 169-175.
Et M, Çolak R, 1995. On some generalized difference sequence spaces. Soochow J. Math., 21: 377-386.
Et M, Esi A, 2000. On Köthe-Toeplitz duals of generalized difference sequence spaces. Bull. Malays. Math. Sci. Soc. (2), 23: 25-32.
Et M, Karakaya V, 2014. A new difference sequence set of order and its geometrical properties. Abstr. Appl. Anal., Art. ID 278907: 4 p.
García-Falset J, 1994. Stability and fixed points for nonexpansive mappings. Houston J. Math., 20: 495-506.
Gaur AK, Mursaleen M, 1998. Difference sequence spaces. Internat. J. Math. Math. Sci., 21: 701-706.
Kara EE, 2013. Some topological and geometrical properties of new Banach sequence spaces. J. Inequal. Appl., 38: 15 pp.
Kara EE, Başarır M, 2012. An application of Fibonacci numbers into infinite Toeplitz matrices. Caspian Journal of Mathematics Sciences, 1: 1-6.
Karakaş M, 2015. A new regular matrix defined by Fibonacci numbers and its applications. BEU Journal of Science, 4: 205-210.
Karakaş M, Çınar M, Et M, 2013. Some geometric properties of a new sequence space. J. Comput. Anal. Appl., 15: 23-31.
Karakaş M, Et M, Karakaya V, 2013. Some geometric properties of a new difference sequence space involving lacunary sequences. Acta Math. Sci. Ser. B Engl. Ed., 33: 1711-1720.
Karakaya V, Altun F, 2014. On some geometric properties of a new paranormed sequence space. J. Funct. Spaces, Art. ID 685382: 8 p.
Kızmaz H, 1981. On certain sequence spaces. Canad. Math. Bull., 24: 169-176.
Koshy T, 2001. Fibonacci and Lucas Numbers with Applications. John Wiley&Sons, Canada. 672 p.
Mursaleen M, 1996. Generalized spaces of difference sequences. J. Math. Anal. Appl., 203: 738-745.
Mursaleen M, Başar F, Altay B, 2006. On the Euler sequence spaces which include the spaces and II. Nonlinear Analysis, 65: 707-717.
Mursaleen M, Çolak R, Et M, 2007. Some geometric inequalities in a new Banach sequence space. J. Inequal. Appl., Art. ID 86757: 6 p.
Mursaleen M, Noman AK, 2010. On some new difference sequence spaces of non-absolute type. Math. Comput. Modelling, 52: 603-617.
Mursaleen M, Noman AK, 2010. On the spaces of -convergent and bounded sequences. Thai J. Math., 8: 311-329.
Mursaleen M, Noman AK, 2011. On some new sequence spaces of non-absolute type related to the spaces and I. Filomat, 25: 33-51.
Savaş E, Karakaya V, Şimşek N, 2009. Some -type new sequence spaces and their geometric properties. Abstr. Appl. Anal., Art. ID 696971: 12 pp.
Vajda S, 2008. Fibonacci and Lucas Numbers, and the Golden Section Theory and Applications. Dover Edition, NewYork, USA. 189 p.
Wilansky A, 1984. Summability Through Functional Analysis. Elseiver Science Publishers BV, Amsterdam, The Netherlands. 317 p.