Abstract
Two generalized results were established, concerning the absolute matrix summability. Bor [2,3,4,5,6,7,8,9,10] worked on many interesting results dealing with \(|\overline{N}, p_n|_k\) absolute Riesz summability. Özarslan and many other authors have been worked on matrix summability. In [14,15,16,17,18,19,20,21], they gave new and advanced results on matrix summability and generalize many theorems of Bor. Sonker and Jindal [23, 24] worked on triple product summability means and absolute matrix summability. Özarslan and Yavuz [16] proved two results on \(|U, p_l|_q\) summability factors. Here, we generalized both the results for \(\varphi -|U, p_l|_q\) matrix summability. Further, we develop new and arbitrary previous findings from the main theorems.
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The authors were highly thankful for the financial support to the Science and Engineering Research Board through Project No.: EEQ/2018/000393.
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Sonker, S., Jindal, R. (2023). A New Result Using Quasi-\(\beta \)-Power Increasing Sequence. In: Sahni, M., Merigó, J.M., Hussain, W., León-Castro, E., Verma, R.K., Sahni, R. (eds) Mathematical Modeling, Computational Intelligence Techniques and Renewable Energy. Advances in Intelligent Systems and Computing, vol 1440. Springer, Singapore. https://doi.org/10.1007/978-981-19-9906-2_1
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