Publication: Hankel Determinants of Normalized Analytic Functions Associated with Hyperbolic Secant Function
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Abstract
In this paper, we consider a subclass of normalized analytic functions associated with the hyperbolic secant function. We compute the sharp bounds on third- and fourth-order Hermitian–Toeplitz determinants for functions in this class. Moreover, we determine the bounds on second- and third-order Hankel determinants, as well as on the generalized Zalcman conjecture. We examine a Briot–Bouquet-type differential subordination involving the Bernardi integral operator. Finally, we obtain a univalent solution to the Briot–Bouquet differential equation, and discuss the majorization property for such function classes. © 2024 by the authors.
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Kumar, S., Breaz, D., Cotîrlă, L. I., & Çetinkaya, A. (2024). Hankel determinants of normalized analytic functions associated with hyperbolic secant function. Symmetry, 16(10), 1303.