Author:
Senguttuvan A.,Mohankumar D.,Ganapathy R. R.,Karthikeyan K. R.
Abstract
We have introduced a comprehensive subclass of analytic functions with respect to (j,k) - symmetric points. We have obtained the interesting coefficient bounds for the newly defined classes of functions. Further, we have extended the study using quantum calculus. Our main results have several applications, here we have presented only a few of them.
Publisher
Universiti Putra Malaysia
Reference47 articles.
1. P. Agarwal, R. P. Agarwal & M. Ruzhansky (2020). Special functions and analysis of differential equations (1st ed.). Chapman and Hall/CRC, London, United Kingdom.
2. P. Agarwal, S. S. Dragomir, M. Jleli & B. Samet (2018). Advances in mathematical inequalities and applications. Birkhäuser/Springer, Singapore.
3. P. Agarwal, M. Vivas-Cortez, Y. Rangel-Oliveros & M. A. Ali (2022). New Ostrowski type inequalities for generalized s-convex functions with applications to some special means of real numbers and to midpoint formula. AIMS Mathematics, 7(1), 1429–1444. https://doi.org/ 10.3934/math.2022084.
4. O. Ahuja, N. Bohra, A. Çetinkaya & S. Kumar (2021). Univalent functions associated with the symmetric points and cardioid-shaped domain involving (p, q)-calculus. Kyungpook Mathematical Journal, 61(1), 75–98.
5. F. S. M. Al Sarari, B. A. Frasin, T. Al-Hawary & S. Latha (2016). A few results on generalized Janowski type functions associated with (j, k)-symmetrical functions. Acta Universitatis Sapientiae Mathematica, 8(2), 195–205. https://doi.org/10.1515/ausm-2016-0012.
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2 articles.
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