Research article

Estimate for Schwarzian derivative of certain close-to-convex functions

  • Received: 29 May 2021 Accepted: 12 July 2021 Published: 26 July 2021
  • MSC : 30C45

  • Let $ f(z) $ be analytic in the unit disk with $ f(0) = f'(0)-1 = 0 $. For the following close-to-convex subclasses: $ \Re \{(1-z)f'(z)\} > 0, $ $ \Re \{(1-z^{2})f'(z)\} > 0, $ $ \Re \{(1-z+z^{2})f'(z)\} > 0 $ and $ \Re \{(1-z)^{2}f'(z)\} > 0 $, we investigate the bounds for the first two consecutive derivatives of higher order Schwarzian derivatives of $ f(z) $.

    Citation: Zhenyong Hu, Xiaoyuan Wang, Jinhua Fan. Estimate for Schwarzian derivative of certain close-to-convex functions[J]. AIMS Mathematics, 2021, 6(10): 10778-10788. doi: 10.3934/math.2021626

    Related Papers:

  • Let $ f(z) $ be analytic in the unit disk with $ f(0) = f'(0)-1 = 0 $. For the following close-to-convex subclasses: $ \Re \{(1-z)f'(z)\} > 0, $ $ \Re \{(1-z^{2})f'(z)\} > 0, $ $ \Re \{(1-z+z^{2})f'(z)\} > 0 $ and $ \Re \{(1-z)^{2}f'(z)\} > 0 $, we investigate the bounds for the first two consecutive derivatives of higher order Schwarzian derivatives of $ f(z) $.



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