Bulletin of the Korean Mathematical Society (대한수학회보)

Korean Mathematical Society (대한수학회)
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ON HARMONIC CONVOLUTIONS INVOLVING A VERTICAL STRIP MAPPING

  • Kumar, Raj (Department of Mathematics DAV University, Sant Longowal Institute of Engineering and Technology) ;
  • Gupta, Sushma (Sant Longowal Institute of Engineering and Technology) ;
  • Singh, Sukhjit (Sant Longowal Institute of Engineering and Technology) ;
  • Dorff, Michael (Department of Mathematics Brigham Young University)
  • Received : 2013.08.28
  • Published : 2015.01.31
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Abstract

Let $f_{\beta}=h_{\beta}+\bar{g}_{\beta}$ and $F_a=H_a+\bar{G}_a$ be harmonic mappings obtained by shearing of analytic mappings $h_{\beta}+g_{\beta}=1/(2isin{\beta})log\((1+ze^{i{\beta}})/(1+ze^{-i{\beta}})\)$, 0 < ${\beta}$ < ${\pi}$ and $H_a+G_a=z/(1-z)$, respectively. Kumar et al. [7] conjectured that if ${\omega}(z)=e^{i{\theta}}z^n({\theta}{\in}\mathbb{R},n{\in}\mathbb{N})$ and ${\omega}_a(z)=(a-z)/(1-az)$, $a{\in}(-1,1)$ are dilatations of $f_{\beta}$ and $F_a$, respectively, then $F_a\tilde{\ast}f_{\beta}{\in}S^0_H$ and is convex in the direction of the real axis, provided $a{\in}[(n-2)/(n+2),1)$. They claimed to have verified the result for n = 1, 2, 3 and 4 only. In the present paper, we settle the above conjecture, in the affirmative, for ${\beta}={\pi}/2$ and for all $n{\in}\mathbb{N}$.

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References

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  2. A NOTE ON CONVEXITY OF CONVOLUTIONS OF HARMONIC MAPPINGS vol.52, pp.6, 2015, https://doi.org/10.4134/BKMS.2015.52.6.1925
  3. NOTE ON THE CONVOLUTION OF HARMONIC MAPPINGS pp.1755-1633, 2019, https://doi.org/10.1017/S0004972719000029