Third Hankel determinant for the inverse of reciprocal of bounded turning functions has a positive real part of order alpha

Авторы

  • B. Venkateswarlu
    Department of Mathematics, GST, GITAM University, Benguluru Rural Dist-562 163, Karnataka, India
  • N. Rani
    Department of Sciences and Humanities, Praveenya Institute of Marine Engineering and Maritime studies, Modavalasa- 534 002, Visakhapatnam, A. P., India

Ключевые слова:

univalent function, function whose reciprocal derivative has a positive real part, third Hankel determinant, positive real function, Toeplitz determinants.

Аннотация

Let $RT$ be the class of functions $f(z)$ univalent in the unit disk $E = {z : |z| < 1}$ such that $\mathrm{Re}\, f'(z) > 0$, $z\in E$, and $H_3(1)$ be the third Hankel determinant for inverse function to $f(z)$. In this paper we obtain, first an upper bound for the second Hankel determinant, $|t_2 t_3 - t_4|$, and the best possible upper bound for the third Hankel determinant $H3(1)$ for the functions in the class of inverse of reciprocal of bounded turning functions having a positive real part of order alpha.

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Опубликован

20.06.2017