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http://dx.doi.org/10.4134/BKMS.2006.43.1.179

A CLASS OF MULTIVALENT FUNCTIONS WITH NEGATIVE COEFFICIENTS DEFINED BY CONVOLUTION  

Ali Rosihan M. (SCHOOL OF MATHEMATICAL SCIENCES, UNIVERSITI SAINS MALAYSIA)
Khan M. Hussain (DEPARTMENT OF MATHEMATICS, ISLAMIAH COLLEGE, VANIAMBADI)
Ravichandran V. (SCHOOL OF MATHEMATICAL SCIENCES, UNIVERSITI SAINS MALAYSIA)
Subramanian K.G. (DEPARTMENT OF MATHEMATICS, MADRAS CHRISTIAN COLLEGE, TAMBARAM)
Publication Information
Bulletin of the Korean Mathematical Society / v.43, no.1, 2006 , pp. 179-188 More about this Journal
Abstract
For a given p-valent analytic function g with positive coefficients in the open unit disk $\Delta$, we study a class of functions $f(z) = z^p - \sum\limits{_{n=m}}{^\infty} a_nz^n(a_n{\geq}0)$ satisfying $$\frac 1 {p}{\Re}\;(\frac {z(f*g)'(z)} {(f*g)(z)})\;>\;\alpha\;(0{\leq}\;\alpha\;<\;1;z{\in}{\Delta})$$ Coefficient inequalities, distortion and covering theorems, as well as closure theorems are determined. The results obtained extend several known results as special cases.
Keywords
starlike function; convolution; subordination; negative coefficients;
Citations & Related Records

Times Cited By SCOPUS : 7
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