Inequalities for analytic functions associated with hyperbolic cosine function
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Karaganda National Research University named after àcademician Ye.A. Buketov
Abstract
In this paper, we investigate the geometric properties of a specific subclass of analytic functions satisfying
the condition f0(z) cosh(
p
z) meaning that the function f0(z) is subordinate to the function cosh(
p
z).
Also, we focus on deriving sharp inequalities for Taylor coefficients, particularly for b2 and the modulus of the
second derivative f00(z). Utilizing the Schwarz lemma, both on the unit disc and on its boundary, we provide
essential insights into the distortion and growth behaviors of these functions. The paper demonstrates the
sharpness of these inequalities through extremal functions and applies the Julia–Wolff lemma to establish
boundary behavior results. These findings contribute significantly to the understanding of the analytic
functions associated with the hyperbolic cosine function, with potential applications in geometric function
theory. It is considered that the extremal functions obtained in this study could be potential hyperbolic
activation functions in neural network architectures. This perspective builds a conceptual bridge between
geometric function theory and artificial intelligence, indicating that insights from complex analysis can
inspire the development of more effective and theoretically grounded activation mechanisms in deep learning.
Empirical evaluation of architectures built with novel activation functions may be considered as potential
future work.
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Citation
Azeroglu T. Inequalities for analytic functions associated with hyperbolic cosine function / T. Azeroglu, B.N. Ornek, T. Duzenli // Bulletin of the Karaganda University. Mathematics Series. – 2025. – № 4(120). – pp 95-106.