Initial Coefficient Bounds Analysis for Novel Subclasses of Bi-Univalent Functions linked with Horadam Polynomials

S. R. Swamy, Yogesh Nanjadeva, Pankaj Kumar, Tarikere Manjunath Sushma
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Abstract

In this work, we investigate some subclasses of bi-univalent and regular functions associated with Horadam polynomials in the open unit disk $\mathfrak{U}=\{\varsigma\in\mathbb{C}:|\varsigma| <1\}$. For functions that belong to these subclasses, we find bounds on their initial coefficients. The functional problem of Fekete-Szegö is also examined. Along with presenting some new results, we also talk about pertinent connections to earlier findings.
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与霍拉丹多项式相关联的双等价函数新子类的初始系数边界分析
在这项工作中,我们研究了开放单位盘 $\mathfrak{U}=\{\varsigma\in\mathbb{C}:|\varsigma| <1\}$ 中与霍拉丹多项式相关的一些双等价正则函数子类。对于属于这些子类的函数,我们找到了它们初始系数的边界。我们还研究了 Fekete-Szegö 的函数问题。在提出一些新结果的同时,我们还讨论了与早期发现的相关联系。
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