In this research article, we study a bi-univalent subclass Σ related with Faber polynomial and investigate the coefficient estimate |an| for functions in the considered subclass with a gap series condition. Also, we obtain the initial two coefficient estimates |a2|, |a3| and find the Fekete–Szegö functional |a3−a22| for the considered subclass. New results which are further examined are also pointed out in this article.
CITATION STYLE
Janani, T., & Yalcin, S. (2018). Coefficient bounds of bi-univalent functions using faber polynomial. In Trends in Mathematics (pp. 151–159). Springer International Publishing. https://doi.org/10.1007/978-3-030-01120-8_18
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