References

Aouf, M.K., A.O. Mostafa and W.K. Elyamany, 2016. Certain subclass of multivalent functions with higher order derivatives and negative coefficients. Intl. J. Open Prob. Complex Anal., 8: 1-17.
Direct Link  |  

Atshan, W.G. and S.R. Kulkarni, 2008. A generalized ruscheweyh derivatives involving a general fractional derivative operator defined on a class of multivalent functions II. Intl. J. Math. Anal., 2: 97-109.
Direct Link  |  

Atshan, W.G., A.H. Battor and A.M. Dereush, 2014. On a new class of multivalent functions with negative coefficient defined by hadamard Product involving a linear operator. Am. J. Math. Stat., 4: 147-155.

Breaz, N. and R.M. El-Ashwah, 2014. Quasi-hadamard product of some uniformly analytic and P-valent functions with negative coefficients. Carpathian J. Math., 30: 39-45.
Direct Link  |  

Duren, P.L., 1983. [Univalent Functions (Basic Theories of Mathematical Sciences 259)]. Springer, Berlin, Germany, ISBN-13:978-0387907956, Pages: 384 (In German).

El-Qadeem, A.H. and M.A. Mamon, 2018. Comprehensive subclasses of multivalent functions with negative coefficients defined by using a Q-difference operator. Trans. A. Razmadze Math. Inst., 172: 510-526.
CrossRef  |  Direct Link  |  

Li, X., D. Ding, L. Xu, C. Qin and S. Hu, 2017. Certain subclasses of multivalent functions defined by higher-order derivative. J. Funct. Spaces, 2017: 1-6.
CrossRef  |  Direct Link  |  

Littlewood, J.E., 1925. On inequalities in the theory of functions. Proc. London Math. Soc., 2: 481-519.
Direct Link  |  

Mahzoon, H. and S. Latha, 2009. Neighborhoods of multivalent functions. Intl. J. Math. Anal., 3: 1501-1507.
Direct Link  |  

Yang, J. and S. Li, 2012. Properties of certain subclass of multivalent functions with negative coefficients. Intl. J. Math. Sci., 2012: 1-21.
Direct Link  |