Properties of Infinite Matrices and Sequence Spaces

Suresh Kumar Sahani; S.K. Tiwari

doi:10.58578/ajstea.v1i1.1866

Suresh Kumar Sahani M.I.T. Campus, Janakpurdham, Nepal
S.K. Tiwari Dr. C.V. Raman University, Bilaspur, India

Abstract

Some general theorems on the product of matrices and their applications to infinite series have been obtained. All theorems include, as special cases, a set of well-known results. Several specific new results can also be deduced from it.

Keywords: Infinite matrices; T-matrix; α -matrix; γ -matrix

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Sahani, S., & Tiwari, S. (2023). Properties of Infinite Matrices and Sequence Spaces. Asian Journal of Science, Technology, Engineering, and Art, 1(1), 154-167. https://doi.org/10.58578/ajstea.v1i1.1866

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Vol 1 No 1 (2023): Asian Journal of Science, Technology, Engineering, and Art

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Articles

Authors retain copyright and grant the journal right of first publication with the work simultaneously licensed under a Creative Commons Attribution-NonCommercial-ShareAlike 4.0 International License that allows others to share the work with an acknowledgement of the work's authorship and initial publication in this journal.

References

Altay, B. Basar, F. ((2007). Certain topological properties and the duals of the domain of a triangle matrix in sequence spaces, J. Math. Analysis and Appl., 336, 632-645.3.3.

Altay, B. Basar, F. (2005). On some Euler Sequence spaces of non- absolute type, Urkainian. Math. J. 57(1), 1-17, 5.1.

Basar, F. and Altay. (2003). On some sequence spaces of p-bounded variation and related matrix mapping, Urakanian Math. J., 55(10), 136-147, 3.2

Cooke, R.G. (1950). Infinite matrices and sequence spaces. Moumillan.

Dienes, P. (1931). Taylor series. Oxford.

Gangle, A. H. and Sheikh, N.A. (2014). Infinite matrices and Almost Bounded Sequences, Vietnam J. Math., 42, 153-157.

Gangle, A. H., and Sheikh, N.A. (2012). A note on almost convergence and some matrix transformations, Int. J. Mod. Math. Sci. 4, 126-132.

Hill, J.D. (1939). On the space (γ) of convergent series, Tohoku Math. Jour., 45, 332-337.

Kirisci, M. (2015). Integrated and differential sequence spaces, 2015(1), Artcle ID: Jnna-002666, 2-16, doi: 10.5899/2015/jnna-00266.02.

Kirisci, M. (2015). On the Taylor sequence spaces of non-absolute type which include the spaces c_0 and c, J. Math. Anal. 6(2), 22-35.

Kirisci, M. (2016). The application Domain of Infinite matrices on classical Sequence spaces, Department of mathematical Education, Hassa Ali Yuce Education Faculty, Istanbul University, Vega, 34470, Turkey,2016., arXiv:1611.06138v1[Math.F. A.], 18 November.

Krisci, M. (2015). The application of infinite matrices with algorithms, Universal Journal of Mathematics and Applications, 1(11), 1-9.

Nizamuddin, B. H. and Muftah, M.A. (2021). Some applications of infinite matrices on some spaces, Libyyan Journal of Science and Technology, 13(1) , 57-59.

Ramanujan, M.S. (1956). Existence and classification of products of summability matrices, Proc. Indian Academy of Sciences, section A, 44, 171-184.

Ray, S. (2014). Some sequence spaces and their matrix transformation, KUSET, Vol. 10, No.1, November, 73-78.

Sahani, S.K. and Jha D. (2021). A certain studies on degree of approximation of functions by matrix transformation, The mathematics Education, Vol. LV, No. 2, 21-33.

Sahani, S.K., Paudel, G.P., Ghimire, J.L., and Thakur, A.K. (2022). On certain series to series transformationand analytic continuations by matrix methods, Nepal Journal of Mathematical Sciences, Vol. 3, No. 1, 75-80.

Vermes, P. (1946). Product of a T-matrix and a γ -matrix, Journal of the London Mathematical Society, Vol. 21, 129-134.

Vermes, P. (1949). Series to Series Transformation and Analytic Continuation by Matrix Methods, Amer. Jour. Math., 71, 541-562.

Vermes, P. (1951). Conservative Series to Series Transformation Matrices, Acta Scientarum Mathematicarum (Szegad), 14, 23-38.