On Coefficient problems for classes Se and Ce
Abstract
Logarithmic coefficients play a crucial role in the theory of univalent functions. In this study,we focus on the classes Se and Ce of starlike and convex functions, respectively, align* Se := \ f ∈ S : zf'(z)f(z) ez, \ z ∈ D \, align* and align* Ce := \ f ∈ S : 1 + z f''(z)f'(z) ez, \ z ∈ D \. align* This paper investigates the sharp bounds of the logarithmic coefficients and the Hermitian-Toeplitz determinant of these coefficients for the classes Se and Ce. Additionally, we examine the generalized Zalcman conjecture and the generalized Fekete-Szeg\"o inequality for these classes Se and Ce and show that the inequalities are sharp.
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