An exact estimate of the third Hankel determinants for functions inverse to convex functions

Rath, B.; Kumar, K. S.; Krishna, D. V.

doi:10.30970/ms.60.1.34-39

Cited by 3 publications

(1 citation statement)

References 13 publications

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“…The complexity of the challenge significantly increases when addressing the scenario where r = 3 as opposed to r = 2. Babalola [7] was the pioneer in attempting to establish an upper bound for |H 3,1 (f)| across the domains of ℜ, S * , and K. In recent times, multiple researchers have actively pursued the task of determining a upper bound for |H 3,1 (f)| (see [2,3,4,5,6,8,20,21,22,23,24,25])…”

Section: Introductionmentioning

confidence: 99%

Some Coefficient of Inequility for Subclass Of holomorphic Functions

Al-shbeil,

RATH,

ALHEFTHI

et al. 2024

Preprint

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Since the early twentieth century, the investigation of bound fordeterminant of Hankel matrices in analytic univalent functions has been a focalpoint for mathematical research, providing a rich avenue for the exploration ofgeometric properties. Over the years, numerous researchers have striven to establishupper bounds for determinant of the third order Hankel matrix withinvarious subclasses of analytic univalent functions. While these efforts haveyielded valuable insights, the attainment of sharp bounds remained a challengeuntil Know et al. (2018) achieved an exact estimation of the fourth coefficientin the Carath´eodory class. In more recent developments, investigators haveleveraged this precise estimation of the fourth coefficient, alongside the welldefinedvalues of the second and third coefficients within the Carath´eodoryclass. This breakthrough has empowered them to delineate sharp bounds forthe third Hankel determinant in diverse subclasses of analytic univalent functions.This present study embarks on an exploration of upper bounds for thesecond-order Hankel determinant within the realm of analytic functions, subjectto the normalized conditions of f(0) = 0 and f′(0) = 1. We further extendour investigation to specific sub-classes of holomorphic functions, culminatingin the derivation of sharp bounds for a parameter of particular interest. 2020 Mathematics Subject Classification. 30C45, 30C50.

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Section: Introductionmentioning

confidence: 99%

Some Coefficient of Inequility for Subclass Of holomorphic Functions

Al-shbeil,

RATH,

ALHEFTHI

et al. 2024

Preprint

View full text Add to dashboard Cite

show abstract

Some sharp bounds of the third-order Hankel determinant for the inverses of the Ozaki type close-to-convex functions

Srivastava,

Rath,

Kumar

et al. 2024

Bulletin des Sciences Mathématiques

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Sharp Second-Order Hankel Determinants Bounds for Alpha-Convex Functions Connected with Modified Sigmoid Functions

Abbas,

Alhefthi,

Ritelli

et al. 2024

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The study of the Hankel determinant generated by the Maclaurin series of holomorphic functions belonging to particular classes of normalized univalent functions is one of the most significant problems in geometric function theory. Our goal in this study is first to define a family of alpha-convex functions associated with modified sigmoid functions and then to investigate sharp bounds of initial coefficients, Fekete-Szegö inequality, and second-order Hankel determinants. Moreover, we also examine the logarithmic and inverse coefficients of functions within a defined family regarding recent issues. All of the estimations that were found are sharp.

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An exact estimate of the third Hankel determinants for functions inverse to convex functions

Cited by 3 publications

References 13 publications

Some Coefficient of Inequility for Subclass Of holomorphic Functions

Some Coefficient of Inequility for Subclass Of holomorphic Functions

Some sharp bounds of the third-order Hankel determinant for the inverses of the Ozaki type close-to-convex functions

Sharp Second-Order Hankel Determinants Bounds for Alpha-Convex Functions Connected with Modified Sigmoid Functions

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