Coefficient Inequalities of a Comprehensive Subclass of Analytic Functions With Respect to Symmetric Points

Senguttuvan, A.; Mohankumar, D.; Ganapathy, R. R.; Karthikeyan, K. R.

doi:10.47836/mjms.16.3.03

Cited by 3 publications

(2 citation statements)

References 40 publications

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“…Other researchers like Vamshee Krishna et al [28], Patil and Khairnar [29], Prajapat et al [30], Yalcin and Altinkaya [31], Cho et al [32], Lecko et al [33]. Kowalczyk et al [34], Mohd Narzan et al [35], Several other researchers like Mendiratta et al [36], Haiyan Zhang et al [37], khan et al [38], and Senguttuvan et al [39] defined A thorough sub-class of analytic functions with respect to the symmetrical point that has been developed. The current study is expanded by using quantum calculus and tends to investigate the upper bounds of the 3rd Hankel Determinant, for the classes of a star-like function with respect to symmetrical points subordinate to exponential functions.…”

Section: Applicationsmentioning

confidence: 99%

Coefficient Inequalities for Certain Subclass of Starlike Function with respect to Symmetric points related to q-exponential Function

Abbas,

Riaz

2023

Sci Inquiry Rev.

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Section: Applicationsmentioning

confidence: 99%

Coefficient Inequalities for Certain Subclass of Starlike Function with respect to Symmetric points related to q-exponential Function

Abbas,

Riaz

2023

Sci Inquiry Rev.

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“…Motivated by [29] (also see [30,31]), here we study a new class of functions omitting the additional stringent criterion of 1 f − to be one-one. Definition 1.1.…”

Section: Introductionmentioning

confidence: 99%

Unified Solution of Some Properties Related to λ-Pseudo Starlike Functions

Ibrahim,

Karthikeyan

2023

Contemp. Math.

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To unify and extend the study of various subclasses of starlike and convex functions, here we introduce a new subclass of λ-pseudo starlike symmetric functions. To add more versatility to our study, we have defined a new class of functions subordinate to a conic region impacted by the well-known Janowski functions. This study extends well-known results and unifies the studies of various subclasses of α-convex functions. Coefficient estimates of the inverse function and the Fekete-Szegő result for the function class are the main results. Some interesting special cases of our main results are also presented here.

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On a characterization of starlike functions with respect to (2ȷ,ℓ)-symmetric conjugate points

Karthikeyan

Senguttuvan

2023

Asian-European J. Math.

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In this paper, we introduce and study a new subclass of starlike functions with respect to [Formula: see text]-symmetric conjugate points using the principle of subordination. Several relationship with the well-known classes have been established. We have focussed on conic regions when it pertained to applications of our main results. Inclusion results, subordination property and coefficient inequality of the defined class are the main results of this paper. The applications of the results are presented here as corollaries, most of which are extensions of well-known results.

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Coefficient Inequalities of a Comprehensive Subclass of Analytic Functions With Respect to Symmetric Points

Cited by 3 publications

References 40 publications

Coefficient Inequalities for Certain Subclass of Starlike Function with respect to Symmetric points related to q-exponential Function

Coefficient Inequalities for Certain Subclass of Starlike Function with respect to Symmetric points related to q-exponential Function

Unified Solution of Some Properties Related to λ-Pseudo Starlike Functions

On a characterization of starlike functions with respect to (2ȷ,ℓ)-symmetric conjugate points

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