Year 2017,
Volume: 66 Issue: 2, 289 - 296, 01.08.2017
Abstract
In this work, considering bi-Bazilevic functions and using theFaber polynomials, we obtain coefficient expansions for functions in this class.In certain cases, our estimates improve some of those existing coefficient bounds
References
- Airault, H., Symmetric sums associated to the factorization of Grunsky coe¢ cients, in Con- ference, Groups and Symmetries, Montreal, Canada, April 2007.
- Airault, H., Remarks on Faber polynomials, Int. Math. Forum 3 (2008), 449-456.
- Airault, H. and Bouali, H., Diğerential calculus on the Faber polynomials, Bulletin des Sci- ences Mathematiques 130 (2006), 179-222.
- Airault, H. and Ren, J., An algebra of diğerential operators and generating functions on the set of univalent functions, Bulletin des Sciences Mathematiques 126 (2002), 343-367.
- Altınkaya, ¸S. and Yalçın, S., Coe¢ cient Estimates for Two New Subclasses of Bi-univalent Functions with respect to Symmetric Points, Journal of Function Spaces Article ID 145242, (2015), 5 pp.
- Altınkaya, ¸S. and Yalçın, S., Faber polynomial coe¢ cient bounds for a subclass of bi-univalent function, C. R. Acad. Sci. Paris, Ser. I 353 (2015), 1075-1080.
- Bazilevic, I. E., On a case of integrability in quadratures of the Loewner-Kufarev equation, Matematicheskii Sbornik 37 (1955), 471-476.
- Brannan, D. A. and Clunie, J., Aspects of contemporary complex analysis, Proceedings of the NATO Advanced Study Instute Held at University of Durham, New York: Academic Press, 1979.
- Brannan, D. A. and Taha, T. S., On some classes of bi-univalent functions, Studia Universi- tatis Babe¸s-Bolyai Mathematica 31 (1986), 70-77.
- Bulut, S., Magesh N. and Balaji, V. K., Faber polynomial coe¢ cient estimates for certain subclasses of meromorphic bi-univalent functions, C. R. Acad. Sci. Paris, Ser. I, 353 (2015), 113-116.
- Duren, P. L., Univalent Functions, Grundlehren der Mathematischen Wissenschaften, Springer, New York, USA, 259, 1983.
- Faber, G., Über polynomische entwickelungen, Math. Ann. 57 (1903), 1569-1573.
- Frasin, B. A. and Aouf, M. K., New subclasses of bi-univalent functions, Appl. Math. Lett. 24 (2011), 1569-1573.
- Grunsky, H., Koe¢ zientenbedingungen für schlicht abbildende meromorphe funktionen, Math. Zeit. 45 (1939), 29-61.
- Hamidi, S. G. and Jahangiri, J. M., Faber polynomial coe¢ cient estimates for analytic bi- close-to-convex functions, C. R. Acad. Sci. Paris, Ser. I 352 (2014), 17–20.
- Hamidi, S. G. and Jahangiri, J. M., Faber polynomial coe¢ cients of bi-subordinate function, C. R. Acad. Sci. Paris, Ser. I 354 (2016), 365-370.
- Lewin, M., On a coe¢ cient problem for bi-univalent functions, Proc. Amer. Math. Soc. 18 (1967), 63-68.
- Magesh, N., Rosy, T. and Varma, S., Coe¢ cient estimate problem for a new subclass of bi-univalent functions, Journal of Complex Analysis, Volume 2013, Article ID: 474231, 3 pages.
- Magesh, N. and Yamini, J., Coe¢ cient bounds for certain subclasses of bi-univalent functions, Int. Math. Forum, 8 (27) (2013), 1337-1344.
- Netanyahu, E., The minimal distance of the image boundary from the origin and the second coe¢ cient of a univalent function in jzj < 1; Archive for Rational Mechanics and Analysis 32 (1969), 100-112.
- Rosihan, M. A., Lee, S. K., Ravichandran, V. and Supramaniama, S., Coe¢ cient estimates for bi-univalent Ma-Minda starlike and convex functions, Appl. Math. Lett. 25 (2012), 344–351. [22] Schiğer, M., A method of variation within the family of simple functions, Proc. London Math. Soc. 44 (1938), 432-449.
- Schaeğer, A. C. and Spencer, D. C., The coe¢ cients of schlicht functions, Duke Math. J. 10 (1943), 611-635.
- Srivastava, H. M., Mishra, A. K. and Gochhayat, P., Certain subclasses of analytic and bi-univalent functions, Appl. Math. Lett. 23 (2010), 1188-1192.
- Srivastava, H. M., Joshi, S. B., Joshi, S. S. and Pawar, H., Coe¢ cient estimates for certain subclasses of meromorphically bi-univalent functions, Palest. J. Math. 5 (Special Issue: 1) (2016), 250-258.
- Zaprawa, P., On Fekete-Szegö problem for classes of bi-univalent functions, Bull. Belg. Math. Soc. Simon Stevin 21 (2014), 169-178.
- Current address : ¸Sahsene Altınkaya: Department of Mathematics, Faculty of Arts and Science, Uludag University, 16059 Bursa, Turkey.
- E-mail address : sahsene@uludag.edu.tr
- Current address : Sibel Yalçın: Department of Mathematics, Faculty of Arts and Science, Uludag University, 16059 Bursa, Turkey.
- E-mail address : syalcin@uludag.edu.tr
Year 2017,
Volume: 66 Issue: 2, 289 - 296, 01.08.2017
Abstract
References
- Airault, H., Symmetric sums associated to the factorization of Grunsky coe¢ cients, in Con- ference, Groups and Symmetries, Montreal, Canada, April 2007.
- Airault, H., Remarks on Faber polynomials, Int. Math. Forum 3 (2008), 449-456.
- Airault, H. and Bouali, H., Diğerential calculus on the Faber polynomials, Bulletin des Sci- ences Mathematiques 130 (2006), 179-222.
- Airault, H. and Ren, J., An algebra of diğerential operators and generating functions on the set of univalent functions, Bulletin des Sciences Mathematiques 126 (2002), 343-367.
- Altınkaya, ¸S. and Yalçın, S., Coe¢ cient Estimates for Two New Subclasses of Bi-univalent Functions with respect to Symmetric Points, Journal of Function Spaces Article ID 145242, (2015), 5 pp.
- Altınkaya, ¸S. and Yalçın, S., Faber polynomial coe¢ cient bounds for a subclass of bi-univalent function, C. R. Acad. Sci. Paris, Ser. I 353 (2015), 1075-1080.
- Bazilevic, I. E., On a case of integrability in quadratures of the Loewner-Kufarev equation, Matematicheskii Sbornik 37 (1955), 471-476.
- Brannan, D. A. and Clunie, J., Aspects of contemporary complex analysis, Proceedings of the NATO Advanced Study Instute Held at University of Durham, New York: Academic Press, 1979.
- Brannan, D. A. and Taha, T. S., On some classes of bi-univalent functions, Studia Universi- tatis Babe¸s-Bolyai Mathematica 31 (1986), 70-77.
- Bulut, S., Magesh N. and Balaji, V. K., Faber polynomial coe¢ cient estimates for certain subclasses of meromorphic bi-univalent functions, C. R. Acad. Sci. Paris, Ser. I, 353 (2015), 113-116.
- Duren, P. L., Univalent Functions, Grundlehren der Mathematischen Wissenschaften, Springer, New York, USA, 259, 1983.
- Faber, G., Über polynomische entwickelungen, Math. Ann. 57 (1903), 1569-1573.
- Frasin, B. A. and Aouf, M. K., New subclasses of bi-univalent functions, Appl. Math. Lett. 24 (2011), 1569-1573.
- Grunsky, H., Koe¢ zientenbedingungen für schlicht abbildende meromorphe funktionen, Math. Zeit. 45 (1939), 29-61.
- Hamidi, S. G. and Jahangiri, J. M., Faber polynomial coe¢ cient estimates for analytic bi- close-to-convex functions, C. R. Acad. Sci. Paris, Ser. I 352 (2014), 17–20.
- Hamidi, S. G. and Jahangiri, J. M., Faber polynomial coe¢ cients of bi-subordinate function, C. R. Acad. Sci. Paris, Ser. I 354 (2016), 365-370.
- Lewin, M., On a coe¢ cient problem for bi-univalent functions, Proc. Amer. Math. Soc. 18 (1967), 63-68.
- Magesh, N., Rosy, T. and Varma, S., Coe¢ cient estimate problem for a new subclass of bi-univalent functions, Journal of Complex Analysis, Volume 2013, Article ID: 474231, 3 pages.
- Magesh, N. and Yamini, J., Coe¢ cient bounds for certain subclasses of bi-univalent functions, Int. Math. Forum, 8 (27) (2013), 1337-1344.
- Netanyahu, E., The minimal distance of the image boundary from the origin and the second coe¢ cient of a univalent function in jzj < 1; Archive for Rational Mechanics and Analysis 32 (1969), 100-112.
- Rosihan, M. A., Lee, S. K., Ravichandran, V. and Supramaniama, S., Coe¢ cient estimates for bi-univalent Ma-Minda starlike and convex functions, Appl. Math. Lett. 25 (2012), 344–351. [22] Schiğer, M., A method of variation within the family of simple functions, Proc. London Math. Soc. 44 (1938), 432-449.
- Schaeğer, A. C. and Spencer, D. C., The coe¢ cients of schlicht functions, Duke Math. J. 10 (1943), 611-635.
- Srivastava, H. M., Mishra, A. K. and Gochhayat, P., Certain subclasses of analytic and bi-univalent functions, Appl. Math. Lett. 23 (2010), 1188-1192.
- Srivastava, H. M., Joshi, S. B., Joshi, S. S. and Pawar, H., Coe¢ cient estimates for certain subclasses of meromorphically bi-univalent functions, Palest. J. Math. 5 (Special Issue: 1) (2016), 250-258.
- Zaprawa, P., On Fekete-Szegö problem for classes of bi-univalent functions, Bull. Belg. Math. Soc. Simon Stevin 21 (2014), 169-178.
- Current address : ¸Sahsene Altınkaya: Department of Mathematics, Faculty of Arts and Science, Uludag University, 16059 Bursa, Turkey.
- E-mail address : sahsene@uludag.edu.tr
- Current address : Sibel Yalçın: Department of Mathematics, Faculty of Arts and Science, Uludag University, 16059 Bursa, Turkey.
- E-mail address : syalcin@uludag.edu.tr
There are 29 citations in total.
Details
| Primary Language | English |
|---|---|
| Journal Section | Research Articles |
| Authors | |
| Publication Date | August 1, 2017 |
| Published in Issue | Year 2017 Volume: 66 Issue: 2 |
Cite
Cited By
Certain Class of Bi-Bazilevic Functions with Bounded Boundary Rotation Involving Salăgeăn Operator
Constructive Mathematical Analysis
https://doi.org/10.33205/cma.781936
Communications Faculty of Sciences University of Ankara Series A1 Mathematics and Statistics.
