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Year 2024, , 942 - 951, 27.08.2024
https://doi.org/10.15672/hujms.1298097

Abstract

References

  • [1] B. Altay, F. Başar and E. Malkowsky, Matrix transformations on some sequence spaces related to strong Cesàro summability and boundedness, Appl. Math. Comput. 211, 255–264, 2009.
  • [2] C. Aydın and F. Başar, On the new sequence spaces which include the spaces $c_{0}$ and $c$, Hokkaido Math. J. 33 (2), 383–398, 2004.
  • [3] C. Aydın and F. Başar, Some new difference sequence spaces, Appl. Math. Comput. 157 (3), 677–693, 2004.
  • [4] F. Başar, $f$−conservative matrix sequences, Tamkang J. Math. 22, 205–212 1991.
  • [5] F. Başar, Summability Theory and Its Applications, 2nd ed., CRC Press/Taylor & Francis Group, Boca Raton · London · New York, 2022.
  • [6] F. Başar and B. Altay, On the space of sequences of p−bounded variation and related matrix mappings, (English, Ukrainian summary) Ukrain. Mat. Zh. 55 (1) (2003), 108–118; reprinted in Ukrainian Math. J. 55 (1), 136–147, 2003.
  • [7] F. Başar and R. Çolak, Almost-conservative matrix transformations, Turkish J. Math. 13, 91–100, 1989.
  • [8] F. Başar and M. Kirişçi, Almost convergence and generalized difference matrix, Comput. Math. App. 61 (3), 602–611, 2011.
  • [9] F. Başar, E. Malkowsky and B. Altay, Matrix transformations on the matrix domains of triangles in the spaces of strongly C1−summable and bounded sequences, Publ. Math. Debrecen 73 (1-2), 193–213, 2008.
  • [10] F. Başar and İ. Solak, Almost-coercive matrix transformations, Rend. Mat. Appl. 11–2, 249–256, 1991.
  • [11] M. Candan, Vector-valued FK-spaces defined by a modulus function and an infinite matrix, Thai J. Math. 12 (1), 155–165, 2014.
  • [12] M. Candan, Almost convergence and double sequential band matrix, Acta Math. Sci. 34 (2), 354–366 2014.
  • [13] J. Connor, J.A. Fridy and C. Orhan, Core equality results for sequences, J. Math. Anal. Appl. 321, 515–523, 2006.
  • [14] R.G. Cooke, Infinite matrices and sequence spaces, MacMillan, New York, 1950.
  • [15] C. Çakan and H. Coşkun, Some new inequalities related to the invariant means and uniformly bounded function sequences, Appl. Math. Lett. 20, 605–609, 2007.
  • [16] H. Çoşkun and C. Çakan, A class of statistical and $\sigma$−conservative matrices, Czechoslovak Math. J. 55, 791–801, 2005.
  • [17] H. Çoşkun, C. Çakan and M. Mursaleen, On the statistical and $\sigma$−cores, Stud. Math. 154, 29–35, 2003.
  • [18] M.C. Dağlı, A novel conservative matrix arising from Schröder numbers and its properties, Linear Multilinear Algebra 71 (8), 1338–1351, 2023.
  • [19] M.C. Dağlı, A new almost convergent sequence space defined by Schröder matrix, Linear Multilinear Algebra, 71 (11), 1863–1874, 2023.
  • [20] M.C. Dağlı, Matrix mappings and compact operators for Schröder sequence spaces, Turkish J. Math. 46 (6), 2304–2320, 2022.
  • [21] K. Demirci, A-statistical core of a sequence, Demonstr. Math. 33, 43–51, 2000.
  • [22] S. Demiriz, M. İlkhan and E.E. Kara, Almost convergence and Euler totient matrix, Ann. Funct. Anal. 11, 604–616, 2020.
  • [23] J.P. Duran, Infinite matrices and almost convergence, Math. Z. 128, 75–83, 1972.
  • [24] H. Fast, Sur la convergence statistique, Colloq. Math. 2, 241–244, 1951.
  • [25] J.A. Fridy and C. Orhan, Statistical core theorems, J. Math. Anal. Appl. 208, 520– 527, 1997.
  • [26] M. İlkhan, Matrix domain of a regular matrix derived by Euler totient function in the spaces $c_{0}$ and $c$, Mediterr. J. Math. 17 (1), Article no: 27, 2020.
  • [27] M. İlkhan, A new conservative matrix derived by Catalan numbers and its matrix domain in the spaces $c$ and $c_{0}$, Linear Multilinear Algebra 68 (2), 417–434, 2020.
  • [28] M. İlkhan and E.E. Kara, A new Banach space defined by Euler totient matrix operator, Oper. Matrices 13 (2), 527–544, 2019.
  • [29] M.İlkhan, E.E.Kara and F. Usta, Compact operators on the Jordan totient sequence spaces, Math. Methods Appl. Sci. 44 (9), 7666–7675, 2021.
  • [30] M. İlkhan, N. Simsek and E.E. Kara, A new regular infinite matrix defined by Jordan totient function and its matrix domain in ℓp, Math. Methods Appl. Sci. 44 (9), 7622– 7633, 2020.
  • [31] S. Jasrotia, U.P. Singh and K. Raj, Some new observations on Catalan almost convergent sequence spaces and the Catalan core, Acta Sci. Math. (Szeged) 87 (1-2), 153–163, 2021.
  • [32] E.E. Kara and S. Demiriz, Some new paranormed difference sequence spaces derived by Fibonacci numbers, Miskolc Math. Notes 16 (2), 907–923, 2015.
  • [33] E.E. Kara and M. İlkhan, Some properties of generalized Fibonacci sequence spaces, Linear Multilinear Algebra 64 (11), 2208–2223, 2016.
  • [34] M.İ. Kara and E.E. Kara, Matrix transformations and compact operators on Catalan sequence spaces, J. Math. Anal. Appl. 498 (1), Article no: 124925, 2021.
  • [35] A. Karaisa and F. Özger, On almost convergence and difference sequence spaces of order m with core theorems, Gen. Math. Notes 26 (1), 102–125, 2015.
  • [36] M. Karakas, On the sequence spaces involving bell numbers, Linear Multilinear Algebra 71 (14), 2298–2309, 2023.
  • [37] M. Karakas and M.C. Dağlı, Some topologic and geometric properties of new Catalan sequence spaces, Adv. Oper. Theory, 8 (1), Article number: 14, 2023.
  • [38] G. Kılınç and M. Candan, Some generalized Fibonacci difference spaces defined by a sequence of modulus functions, Facta Univ. Ser. Math. Inf. 32, 95–116, 2017.
  • [39] M. Kirişçi and F. Başar, Some new sequence spaces derived by the domain of generalized difference matrix, Comput. Math. Appl. 60 (5), 1299–1309, 2010.
  • [40] M. Mursaleen and F. Başar, Sequence Spaces: Topics in Modern Summability Theory, CRC Press/Taylor & Francis Group, Series: Mathematics and Its Applications, Boca Raton · London · New York, 2020.
  • [41] F. Özger and F. Başar, Domain of the double sequential band matrix $B(\tilde{r},\tilde{s})$ on some Maddox’s spaces, Acta Math. Sci. 34, 394–408, 2014.
  • [42] A.A. Shcherbakov, Kernels of sequences of complex numbers and their regular transformations, Math. Notes 22, 948–953, 1977.
  • [43] J.A. Sıddıqi, Infinite matrices summing every almost periodic sequences, Pacific J. Math. 39, 235–251, 1971.
  • [44] S. Simons, Banach limits, infinite matrices and sublinear functionals, J. Math. Anal. Appl. 26, 640–655, 1969.
  • [45] R.P. Stanley, Catalan Numbers, Cambridge University Press, New York, 2015.
  • [46] H. Steinhaus, Sur la convergence ordinaire et la convergence asymptotique, Colloq. Math. 2, 73–74, 1951.
  • [47] H. Steinhaus, Quality control by sampling, Colloq. Math. 2, 98–108, 1951.
  • [48] Q. Qamaruddin and S.A. Mohuiddine, Almost convergence and some matrix transformations, Filomat 21, 261–266, 2007.
  • [49] T. Yaying and B. Hazarika, On sequence spaces defined by the domain of a regular Tribonacci matrix, Math. Slovaca 70 (3), 697–706, 2020.
  • [50] T. Yaying and M.İ. Kara, On sequence spaces defined by the domain of tribonacci matrix in $c_{0}$ and $c$, Korean J. Math. 29 (1), 25–40, 2021.

Certain topological properties for almost convergent Catalan-Motzkin sequence space

Year 2024, , 942 - 951, 27.08.2024
https://doi.org/10.15672/hujms.1298097

Abstract

The purpose of this paper is to introduce a new almost convergent sequence space by means of a matrix involving Catalan and Motzkin numbers. It is demonstrated that this novel sequence space and the space of all almost convergent sequences are linearly isomorphic and the $\beta$-dual of this new space is deduced. In addition, by defining Catalan-Motzkin core of a complex-valued sequence, certain inclusion relations are derived for it.

References

  • [1] B. Altay, F. Başar and E. Malkowsky, Matrix transformations on some sequence spaces related to strong Cesàro summability and boundedness, Appl. Math. Comput. 211, 255–264, 2009.
  • [2] C. Aydın and F. Başar, On the new sequence spaces which include the spaces $c_{0}$ and $c$, Hokkaido Math. J. 33 (2), 383–398, 2004.
  • [3] C. Aydın and F. Başar, Some new difference sequence spaces, Appl. Math. Comput. 157 (3), 677–693, 2004.
  • [4] F. Başar, $f$−conservative matrix sequences, Tamkang J. Math. 22, 205–212 1991.
  • [5] F. Başar, Summability Theory and Its Applications, 2nd ed., CRC Press/Taylor & Francis Group, Boca Raton · London · New York, 2022.
  • [6] F. Başar and B. Altay, On the space of sequences of p−bounded variation and related matrix mappings, (English, Ukrainian summary) Ukrain. Mat. Zh. 55 (1) (2003), 108–118; reprinted in Ukrainian Math. J. 55 (1), 136–147, 2003.
  • [7] F. Başar and R. Çolak, Almost-conservative matrix transformations, Turkish J. Math. 13, 91–100, 1989.
  • [8] F. Başar and M. Kirişçi, Almost convergence and generalized difference matrix, Comput. Math. App. 61 (3), 602–611, 2011.
  • [9] F. Başar, E. Malkowsky and B. Altay, Matrix transformations on the matrix domains of triangles in the spaces of strongly C1−summable and bounded sequences, Publ. Math. Debrecen 73 (1-2), 193–213, 2008.
  • [10] F. Başar and İ. Solak, Almost-coercive matrix transformations, Rend. Mat. Appl. 11–2, 249–256, 1991.
  • [11] M. Candan, Vector-valued FK-spaces defined by a modulus function and an infinite matrix, Thai J. Math. 12 (1), 155–165, 2014.
  • [12] M. Candan, Almost convergence and double sequential band matrix, Acta Math. Sci. 34 (2), 354–366 2014.
  • [13] J. Connor, J.A. Fridy and C. Orhan, Core equality results for sequences, J. Math. Anal. Appl. 321, 515–523, 2006.
  • [14] R.G. Cooke, Infinite matrices and sequence spaces, MacMillan, New York, 1950.
  • [15] C. Çakan and H. Coşkun, Some new inequalities related to the invariant means and uniformly bounded function sequences, Appl. Math. Lett. 20, 605–609, 2007.
  • [16] H. Çoşkun and C. Çakan, A class of statistical and $\sigma$−conservative matrices, Czechoslovak Math. J. 55, 791–801, 2005.
  • [17] H. Çoşkun, C. Çakan and M. Mursaleen, On the statistical and $\sigma$−cores, Stud. Math. 154, 29–35, 2003.
  • [18] M.C. Dağlı, A novel conservative matrix arising from Schröder numbers and its properties, Linear Multilinear Algebra 71 (8), 1338–1351, 2023.
  • [19] M.C. Dağlı, A new almost convergent sequence space defined by Schröder matrix, Linear Multilinear Algebra, 71 (11), 1863–1874, 2023.
  • [20] M.C. Dağlı, Matrix mappings and compact operators for Schröder sequence spaces, Turkish J. Math. 46 (6), 2304–2320, 2022.
  • [21] K. Demirci, A-statistical core of a sequence, Demonstr. Math. 33, 43–51, 2000.
  • [22] S. Demiriz, M. İlkhan and E.E. Kara, Almost convergence and Euler totient matrix, Ann. Funct. Anal. 11, 604–616, 2020.
  • [23] J.P. Duran, Infinite matrices and almost convergence, Math. Z. 128, 75–83, 1972.
  • [24] H. Fast, Sur la convergence statistique, Colloq. Math. 2, 241–244, 1951.
  • [25] J.A. Fridy and C. Orhan, Statistical core theorems, J. Math. Anal. Appl. 208, 520– 527, 1997.
  • [26] M. İlkhan, Matrix domain of a regular matrix derived by Euler totient function in the spaces $c_{0}$ and $c$, Mediterr. J. Math. 17 (1), Article no: 27, 2020.
  • [27] M. İlkhan, A new conservative matrix derived by Catalan numbers and its matrix domain in the spaces $c$ and $c_{0}$, Linear Multilinear Algebra 68 (2), 417–434, 2020.
  • [28] M. İlkhan and E.E. Kara, A new Banach space defined by Euler totient matrix operator, Oper. Matrices 13 (2), 527–544, 2019.
  • [29] M.İlkhan, E.E.Kara and F. Usta, Compact operators on the Jordan totient sequence spaces, Math. Methods Appl. Sci. 44 (9), 7666–7675, 2021.
  • [30] M. İlkhan, N. Simsek and E.E. Kara, A new regular infinite matrix defined by Jordan totient function and its matrix domain in ℓp, Math. Methods Appl. Sci. 44 (9), 7622– 7633, 2020.
  • [31] S. Jasrotia, U.P. Singh and K. Raj, Some new observations on Catalan almost convergent sequence spaces and the Catalan core, Acta Sci. Math. (Szeged) 87 (1-2), 153–163, 2021.
  • [32] E.E. Kara and S. Demiriz, Some new paranormed difference sequence spaces derived by Fibonacci numbers, Miskolc Math. Notes 16 (2), 907–923, 2015.
  • [33] E.E. Kara and M. İlkhan, Some properties of generalized Fibonacci sequence spaces, Linear Multilinear Algebra 64 (11), 2208–2223, 2016.
  • [34] M.İ. Kara and E.E. Kara, Matrix transformations and compact operators on Catalan sequence spaces, J. Math. Anal. Appl. 498 (1), Article no: 124925, 2021.
  • [35] A. Karaisa and F. Özger, On almost convergence and difference sequence spaces of order m with core theorems, Gen. Math. Notes 26 (1), 102–125, 2015.
  • [36] M. Karakas, On the sequence spaces involving bell numbers, Linear Multilinear Algebra 71 (14), 2298–2309, 2023.
  • [37] M. Karakas and M.C. Dağlı, Some topologic and geometric properties of new Catalan sequence spaces, Adv. Oper. Theory, 8 (1), Article number: 14, 2023.
  • [38] G. Kılınç and M. Candan, Some generalized Fibonacci difference spaces defined by a sequence of modulus functions, Facta Univ. Ser. Math. Inf. 32, 95–116, 2017.
  • [39] M. Kirişçi and F. Başar, Some new sequence spaces derived by the domain of generalized difference matrix, Comput. Math. Appl. 60 (5), 1299–1309, 2010.
  • [40] M. Mursaleen and F. Başar, Sequence Spaces: Topics in Modern Summability Theory, CRC Press/Taylor & Francis Group, Series: Mathematics and Its Applications, Boca Raton · London · New York, 2020.
  • [41] F. Özger and F. Başar, Domain of the double sequential band matrix $B(\tilde{r},\tilde{s})$ on some Maddox’s spaces, Acta Math. Sci. 34, 394–408, 2014.
  • [42] A.A. Shcherbakov, Kernels of sequences of complex numbers and their regular transformations, Math. Notes 22, 948–953, 1977.
  • [43] J.A. Sıddıqi, Infinite matrices summing every almost periodic sequences, Pacific J. Math. 39, 235–251, 1971.
  • [44] S. Simons, Banach limits, infinite matrices and sublinear functionals, J. Math. Anal. Appl. 26, 640–655, 1969.
  • [45] R.P. Stanley, Catalan Numbers, Cambridge University Press, New York, 2015.
  • [46] H. Steinhaus, Sur la convergence ordinaire et la convergence asymptotique, Colloq. Math. 2, 73–74, 1951.
  • [47] H. Steinhaus, Quality control by sampling, Colloq. Math. 2, 98–108, 1951.
  • [48] Q. Qamaruddin and S.A. Mohuiddine, Almost convergence and some matrix transformations, Filomat 21, 261–266, 2007.
  • [49] T. Yaying and B. Hazarika, On sequence spaces defined by the domain of a regular Tribonacci matrix, Math. Slovaca 70 (3), 697–706, 2020.
  • [50] T. Yaying and M.İ. Kara, On sequence spaces defined by the domain of tribonacci matrix in $c_{0}$ and $c$, Korean J. Math. 29 (1), 25–40, 2021.
There are 50 citations in total.

Details

Primary Language English
Subjects Mathematical Sciences
Journal Section Mathematics
Authors

Muhammet Cihat Dağlı 0000-0003-2859-902X

Early Pub Date September 14, 2023
Publication Date August 27, 2024
Published in Issue Year 2024

Cite

APA Dağlı, M. C. (2024). Certain topological properties for almost convergent Catalan-Motzkin sequence space. Hacettepe Journal of Mathematics and Statistics, 53(4), 942-951. https://doi.org/10.15672/hujms.1298097
AMA Dağlı MC. Certain topological properties for almost convergent Catalan-Motzkin sequence space. Hacettepe Journal of Mathematics and Statistics. August 2024;53(4):942-951. doi:10.15672/hujms.1298097
Chicago Dağlı, Muhammet Cihat. “Certain Topological Properties for Almost Convergent Catalan-Motzkin Sequence Space”. Hacettepe Journal of Mathematics and Statistics 53, no. 4 (August 2024): 942-51. https://doi.org/10.15672/hujms.1298097.
EndNote Dağlı MC (August 1, 2024) Certain topological properties for almost convergent Catalan-Motzkin sequence space. Hacettepe Journal of Mathematics and Statistics 53 4 942–951.
IEEE M. C. Dağlı, “Certain topological properties for almost convergent Catalan-Motzkin sequence space”, Hacettepe Journal of Mathematics and Statistics, vol. 53, no. 4, pp. 942–951, 2024, doi: 10.15672/hujms.1298097.
ISNAD Dağlı, Muhammet Cihat. “Certain Topological Properties for Almost Convergent Catalan-Motzkin Sequence Space”. Hacettepe Journal of Mathematics and Statistics 53/4 (August 2024), 942-951. https://doi.org/10.15672/hujms.1298097.
JAMA Dağlı MC. Certain topological properties for almost convergent Catalan-Motzkin sequence space. Hacettepe Journal of Mathematics and Statistics. 2024;53:942–951.
MLA Dağlı, Muhammet Cihat. “Certain Topological Properties for Almost Convergent Catalan-Motzkin Sequence Space”. Hacettepe Journal of Mathematics and Statistics, vol. 53, no. 4, 2024, pp. 942-51, doi:10.15672/hujms.1298097.
Vancouver Dağlı MC. Certain topological properties for almost convergent Catalan-Motzkin sequence space. Hacettepe Journal of Mathematics and Statistics. 2024;53(4):942-51.