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Hankel and Toeplitz determinant for a subclass of multivalent $ q $-starlike functions of order $ \alpha $

  • Received: 30 December 2020 Accepted: 05 March 2021 Published: 15 March 2021
  • MSC : Primary: 05A30, 30C45; Secondary: 11B65, 47B38

  • In this paper our aim is to study some valuable problems dealing with newly defined subclass of multivalent $ q $-starlike functions. These problems include the initial coefficient estimates, Toeplitz matrices, Hankel determinant, Fekete-Szego problem, upper bounds of the functional $ \left \vert a_{p+1}-\mu a_{p+1}^{2}\right \vert $ for the subclass of multivalent $ q $-starlike functions. As applications we study a $ q $-Bernardi integral operator for a subclass of multivalent $ q $-starlike functions. Furthermore, we also highlight some known consequence of our main results.

    Citation: Huo Tang, Shahid Khan, Saqib Hussain, Nasir Khan. Hankel and Toeplitz determinant for a subclass of multivalent $ q $-starlike functions of order $ \alpha $[J]. AIMS Mathematics, 2021, 6(6): 5421-5439. doi: 10.3934/math.2021320

    Related Papers:

  • In this paper our aim is to study some valuable problems dealing with newly defined subclass of multivalent $ q $-starlike functions. These problems include the initial coefficient estimates, Toeplitz matrices, Hankel determinant, Fekete-Szego problem, upper bounds of the functional $ \left \vert a_{p+1}-\mu a_{p+1}^{2}\right \vert $ for the subclass of multivalent $ q $-starlike functions. As applications we study a $ q $-Bernardi integral operator for a subclass of multivalent $ q $-starlike functions. Furthermore, we also highlight some known consequence of our main results.



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