Neighborhoods of Certain Classes of Analytic Functions Defined by Normalized Function az^2 J_ϑ'' (z)+bzJ_ϑ' (z)+cJ_ϑ (z)

Murat Çağlar; Erhan Deniz; Sercan Kazımoğlu

Research Article

Year 2020, Volume: 5 Issue: 3, 226 - 232, 30.12.2020

Murat Çağlar Erhan Deniz Sercan Kazımoğlu

Abstract

References

[1] Altıntaş, O. and Owa, S. Neighborhoods of certain analytic functions with negative coefficients, Int. J. Math. and Math. Sci. 19, 797-800, 1996.
[2] Altıntaş, O., Özkan, E. and Srivastava, H. M. Neighborhoods of a class of analytic functions with negative coefficients, Appl. Math. Let. 13, 63-67, 2000.
[3] Baricz, A., Çağlar, M. and Deniz, E. Starlikeness of bessel functions and their derivatives, Math. Inequal. Appl. 19(2), 439-449, 2016.
[4] Catas, A. Neighborhoods of a certain class of analytic functions with negative coefficients, Banach J. Math. Anal., 3(1), No. 1, 111-121, 2009.
[5] Darwish, H. E., Lashin A. Y. and Hassan B. F. Neighborhood properties of generalized Bessel function, Global Journal of Science Frontier Research (F), 15(9), 21-26, 2015.
[6] Deniz, E. and Orhan, H. Some properties of certain subclasses of analytic functions with negative coefficients by using generalized Ruscheweyh derivative operator, Czechoslovak Math. J., 60(135), 699–713, 2010.
[7] Elhaddad, S., Aldweby, H. and Darus, M. Neighborhoods of certain classes of analytic functions defined by generalized differential operator involving Mittag-Leffler function, Acta Universitatis Apulensis, No. 55, 1-10, 2018.
[8] Goodman, A. W. Univalent functions and nonanalytic curves, Proc. Amer. Math. Soc., 8, 598-601, 1957.
[9] Ismail, M. E. H. and Muldoon, M.E. Bounds for the small real and purely imaginary zeros of Bessel and related functions, Meth. Appl. Anal. 2(1), 1-21 1995.
[10] Keerthi, B. S., Gangadharan, A. and Srivastava, H. M. Neighborhoods of certain subclasses of analytic functions of complex order with negative coefficients, Math. Comput. Model. 47, 271-277, 2008.
[11] Mercer, A. McD. The zeros of az^2 J_ϑ^'' (z)+bzJ_ϑ^' (z)+cJ_ϑ (z) as functions of order, Internat. J. Math. Math. Sci., 15, 319-322, 1992.
[12] Murugusundaramoorthy, G. and Srivastava, H. M. Neighborhoods of certain classes of analytic functions of complex order, J. Inequal. Pure Appl. Math. 5(2), Art. 24. 8 pp., 2004.
[13] Olver, F. W. J., Lozier, D. W., Boisvert, R. F. and Clark C. W. (Eds.), NIST Handbook of Mathematical Functions, Cambridge Univ. Press, Cambridge, 2010.
[14] Orhan, H. On neighborhoods of analytic functions defined by using hadamard product, Novi Sad J. Math., 37(1), 17-25, 2007.
[15] Owa, S., Sekine, T. and Yamakawa, R. On Sakaguchi type functions, Appl. Math. Comput., 187, 356-361, 2007.
[16] Ruscheweyh, S. Neighborhoods of univalent functions, Proc. Amer. Math. Soc., 81(4), 521-527, 1981.
[17] Shah, S. M. and Trimble, S. Y. Entire functions with univalent derivatives, J. Math. Anal. Appl., 33, 220-229, 1971.
[18] Silverman H. Neighborhoods of a classes of analytic function, Far East J. Math. Sci., 3(2), 175-183, 1995.

Neighborhoods of Certain Classes of Analytic Functions Defined by Normalized Function az^2 J_ϑ'' (z)+bzJ_ϑ' (z)+cJ_ϑ (z)

Year 2020, Volume: 5 Issue: 3, 226 - 232, 30.12.2020

Murat Çağlar Erhan Deniz Sercan Kazımoğlu

Abstract

In this paper, we introduce a new subclass of analytic functions in the open unit disk U with negative coefficients defined by normalized of the az^2 J_ϑ^'' (z)+bzJ_ϑ^' (z)+cJ_ϑ (z) function, where J_ϑ (z) is called the Bessel function of the first kind of order ϑ. The object of the present paper is to determine coefficient inequalities, inclusion relations and neighborhoods properties for functions f(z) belonging to this subclass.

Keywords

Analytic function, starlike and convex functions, Bessel function, neighborhoods, coefficient inequality, inclusion relation

References

[1] Altıntaş, O. and Owa, S. Neighborhoods of certain analytic functions with negative coefficients, Int. J. Math. and Math. Sci. 19, 797-800, 1996.
[2] Altıntaş, O., Özkan, E. and Srivastava, H. M. Neighborhoods of a class of analytic functions with negative coefficients, Appl. Math. Let. 13, 63-67, 2000.
[3] Baricz, A., Çağlar, M. and Deniz, E. Starlikeness of bessel functions and their derivatives, Math. Inequal. Appl. 19(2), 439-449, 2016.
[4] Catas, A. Neighborhoods of a certain class of analytic functions with negative coefficients, Banach J. Math. Anal., 3(1), No. 1, 111-121, 2009.
[5] Darwish, H. E., Lashin A. Y. and Hassan B. F. Neighborhood properties of generalized Bessel function, Global Journal of Science Frontier Research (F), 15(9), 21-26, 2015.
[6] Deniz, E. and Orhan, H. Some properties of certain subclasses of analytic functions with negative coefficients by using generalized Ruscheweyh derivative operator, Czechoslovak Math. J., 60(135), 699–713, 2010.
[7] Elhaddad, S., Aldweby, H. and Darus, M. Neighborhoods of certain classes of analytic functions defined by generalized differential operator involving Mittag-Leffler function, Acta Universitatis Apulensis, No. 55, 1-10, 2018.
[8] Goodman, A. W. Univalent functions and nonanalytic curves, Proc. Amer. Math. Soc., 8, 598-601, 1957.
[9] Ismail, M. E. H. and Muldoon, M.E. Bounds for the small real and purely imaginary zeros of Bessel and related functions, Meth. Appl. Anal. 2(1), 1-21 1995.
[10] Keerthi, B. S., Gangadharan, A. and Srivastava, H. M. Neighborhoods of certain subclasses of analytic functions of complex order with negative coefficients, Math. Comput. Model. 47, 271-277, 2008.
[11] Mercer, A. McD. The zeros of az^2 J_ϑ^'' (z)+bzJ_ϑ^' (z)+cJ_ϑ (z) as functions of order, Internat. J. Math. Math. Sci., 15, 319-322, 1992.
[12] Murugusundaramoorthy, G. and Srivastava, H. M. Neighborhoods of certain classes of analytic functions of complex order, J. Inequal. Pure Appl. Math. 5(2), Art. 24. 8 pp., 2004.
[13] Olver, F. W. J., Lozier, D. W., Boisvert, R. F. and Clark C. W. (Eds.), NIST Handbook of Mathematical Functions, Cambridge Univ. Press, Cambridge, 2010.
[14] Orhan, H. On neighborhoods of analytic functions defined by using hadamard product, Novi Sad J. Math., 37(1), 17-25, 2007.
[15] Owa, S., Sekine, T. and Yamakawa, R. On Sakaguchi type functions, Appl. Math. Comput., 187, 356-361, 2007.
[16] Ruscheweyh, S. Neighborhoods of univalent functions, Proc. Amer. Math. Soc., 81(4), 521-527, 1981.
[17] Shah, S. M. and Trimble, S. Y. Entire functions with univalent derivatives, J. Math. Anal. Appl., 33, 220-229, 1971.
[18] Silverman H. Neighborhoods of a classes of analytic function, Far East J. Math. Sci., 3(2), 175-183, 1995.

There are 18 citations in total.

Details

Primary Language	English
Journal Section	Volume V Issue III 2020
Authors	Murat Çağlar 0000-0001-8147-0343 Erhan Deniz 0000-0002-9570-8583 Sercan Kazımoğlu 0000-0002-1023-4500
Publication Date	December 30, 2020
Published in Issue	Year 2020 Volume: 5 Issue: 3

Cite

APA	Çağlar, M., Deniz, E., & Kazımoğlu, S. (2020). Neighborhoods of Certain Classes of Analytic Functions Defined by Normalized Function az^2 J_ϑ’’ (z)+bzJ_ϑ’ (z)+cJ_ϑ (z). Turkish Journal of Science, 5(3), 226-232.
AMA	Çağlar M, Deniz E, Kazımoğlu S. Neighborhoods of Certain Classes of Analytic Functions Defined by Normalized Function az^2 J_ϑ’’ (z)+bzJ_ϑ’ (z)+cJ_ϑ (z). TJOS. December 2020;5(3):226-232.
Chicago	Çağlar, Murat, Erhan Deniz, and Sercan Kazımoğlu. “Neighborhoods of Certain Classes of Analytic Functions Defined by Normalized Function az^2 J_ϑ’’ (z)+bzJ_ϑ’ (z)+cJ_ϑ (z)”. Turkish Journal of Science 5, no. 3 (December 2020): 226-32.
EndNote	Çağlar M, Deniz E, Kazımoğlu S (December 1, 2020) Neighborhoods of Certain Classes of Analytic Functions Defined by Normalized Function az^2 J_ϑ’’ (z)+bzJ_ϑ’ (z)+cJ_ϑ (z). Turkish Journal of Science 5 3 226–232.
IEEE	M. Çağlar, E. Deniz, and S. Kazımoğlu, “Neighborhoods of Certain Classes of Analytic Functions Defined by Normalized Function az^2 J_ϑ’’ (z)+bzJ_ϑ’ (z)+cJ_ϑ (z)”, TJOS, vol. 5, no. 3, pp. 226–232, 2020.
ISNAD	Çağlar, Murat et al. “Neighborhoods of Certain Classes of Analytic Functions Defined by Normalized Function az^2 J_ϑ’’ (z)+bzJ_ϑ’ (z)+cJ_ϑ (z)”. Turkish Journal of Science 5/3 (December 2020), 226-232.
JAMA	Çağlar M, Deniz E, Kazımoğlu S. Neighborhoods of Certain Classes of Analytic Functions Defined by Normalized Function az^2 J_ϑ’’ (z)+bzJ_ϑ’ (z)+cJ_ϑ (z). TJOS. 2020;5:226–232.
MLA	Çağlar, Murat et al. “Neighborhoods of Certain Classes of Analytic Functions Defined by Normalized Function az^2 J_ϑ’’ (z)+bzJ_ϑ’ (z)+cJ_ϑ (z)”. Turkish Journal of Science, vol. 5, no. 3, 2020, pp. 226-32.
Vancouver	Çağlar M, Deniz E, Kazımoğlu S. Neighborhoods of Certain Classes of Analytic Functions Defined by Normalized Function az^2 J_ϑ’’ (z)+bzJ_ϑ’ (z)+cJ_ϑ (z). TJOS. 2020;5(3):226-32.

Download Cover Image

Article Files

Full Text