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(α,β,δ)- Neighborhood for Certain Analytic Functions with Negative Coefficients

Journal Name:

  • European Journal of Pure and Applied Mathematics

Publication Year:

  • 2011

Key Words:

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AMS Codes:

Abstract (2. Language): 
In this paper, we introduce ( , ,)−neighborhoods of analytic functions with negative coefficients. Furthermore, we obtain some interesting results for functions belonging to this neighborhoods.
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  • 1
14-19
  • English

REFERENCES

References: 

[1] O.P. Ahuja and M. Nunokawa, Neighborhoods of analytic functions defined by Ruscheweyh
derivatives, Math. Japonica 51. No.3, 487-492. 2000.
[2] O. Altinta¸s, Neighborhoods of certain p-valently analytic functions with negative coeffi-
cients, Appl. Math. Comp., 187, 47–53. 2007.
[3] O. Altinta¸s, Ö. Özkan and H.M. Srivastava, Neighborhoods of a class of analytic functions
with negative coefficients, Appl. Math. Lett., 13 (3), 63–67. 2000.
[4] M.K. Aouf, Neighborhoods of certain classes of analytic functions with negative coefficients,
IJMMS., Article ID 38258, pp. 1-6. 2006.
[5] B.A. Frasin, Neighborhoods of certain subclasses of analytic functions of complex order with
negative coefficients, Aust. J. Math. Ana. Appl.,Vol.7, Issue1, Article 6, pp. 1-7, 2010.
[6] B.A. Frasin and M. Darus, Integral means and neighborhoods for certain analytic univalent
functions with negative coefficients, Soochow J. Math. Comp., Vol. 30 No.3, 217-223.
2004.
[7] B.S. Keerthi, B.A. Stephen, A. Gangadharan and S. Sivasubramanian, Neighborhoods of
certain classes of analytic functions with negative coefficients, IJMMS., Article ID 38258,
pp. 1-6. 2006.
[8] H. Orhan, E. Kadio˘glu, Neighborhoods of a class of analytic functions with negative coeffi-
cients, Tamsui Oxford Journal of Math. Sci., 20 (2) 135–142. 2004.
[9] H. Orhan, M. Kamali, Neighborhoods of a class of analytic functions with negative coef-
ficients, Acta Mathematica Academiae Paedagogiace Nyiregyhaziensi, 4. 1 (21), 55–61.
2005.
[10] H. Orhan, E. Kadio˘glu and S. Owa, (,)-Neighborhood for Certain Analytic Functions,
Proceeding of international symposium “Geometric Function Theory and Applications”
Istanbul Kultur University, 207-213. 2007.
[11] S. Ruscheweyh, Neighborhoods of univalent functions, Proc. Amer. Math.Soc. 81(4), 521-
527. 1981.
[12] G. S˘al˘agean, Subclasses of univalent functions, in “ Complex Analysis: Fifth Romanian-
Finnish Seminar,” Part I (Bucharest, 1981), pp.362-372, Lecture Notes in Mathematics,
Vol. 1013, Springer-Verlag, Berlin/ New York, 1983.
[13] H. Silverman, Neighborhoods of class of analytic functions, Far East J. Math. Sci., 3(2),
165-169. 1995.

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