Bülent Örnek Nafi scite author profile

Bülent Örnek Nafi

5Publications

11Citation Statements Received

57Citation Statements Given

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Affiliations

Amasya University

Publications

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Bound estimates for the derivative of driving point impedance functions

Nafi¹,

Düzenli̇²

2018

Filomat

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In this paper, a boundary analysis is carried out for the derivative of driving point impedance functions, which is mainly used for synthesis of networks containing RL, RC and RLC circuits. It is known that driving point impedance function, Z(s), is an analytic function defined on the right half of the s-plane. In this study, we derive inequalities for the modulus of derivative of driving point impedance function, |Z (0)|, by assuming the Z(s) function is also analytic at the boundary point s = 0 on the imaginary axis and the sharpness of these inequalities is proved. Furthermore, an equation for the driving point impedance function, Z(s), is obtained as a natural result of the proved theorem in this study.

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Estimates for holomorphic functions concerned with Jack’s lemma

Nafi¹

2018

Publ Inst Math (Belgr)

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Behavior of meromorphic functions at the boundary of the unit disc

Nafi

2017

Filomat

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New estimates for meromorphic functions

Nafi

2021

Publ Inst Math (Belgr)

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On the Schwarz lemma at the upper half plane

Nafi

2019

Filomat

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In this paper, we give a simple proof for the boundary Schwarz lemma at the upper half plane. Considering that f (z) is a holomorphic function defined on the upper half plane, we derive inequalities for the modulus of derivative of f (z), f (0) , by assuming that the f (z) function is also holomorphic at the boundary point z = 0 on the real axis with f (0) = f (i). Let E be the unit disc and S = {z ∈ C : z > 0} the upper half plane in C. For i ∈ E, w−i 1+iw defines a conformal self-map of E carrying i to 0. Similary, for any i ∈ S, w → z − i z + i is conformal map of S onto E, i to 0. It follows in particular the S and E are conformal equivalent. Consider the function f (w) = f (z) − f (i)

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