On the regularity of the Hankel determinant sequence of the characteristic sequence of powers of 2

AbstractWe consider a family of analytic and normalized functions that are related to the domains ℍ(s), with a right branch of a hyperbolas H(s) as a boundary. The hyperbola H(s) is given by the relation $\begin{array}{} \frac{1}{\rho}=\left( 2\cos\frac{\varphi}{s}\right)^s\quad (0 \lt s\le 1,\, |\varphi| \lt (\pi s)/2). \end{array}$ We mainly study a coefficient problem of the families of functions for which zf′/f or 1 + zf″/f′ map the unit disk onto a subset of ℍ(s) . We find coefficients bounds, solve Fekete-Szegö problem and estimate the Hankel determinant.

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On Coefficient Problems for Functions Connected with the Sine Function

Symmetry ◽

10.3390/sym13071179 ◽

2021 ◽

Vol 13 (7) ◽

pp. 1179

Author(s):

Katarzyna Tra̧bka-Wiȩcław

Keyword(s):

Analytic Functions ◽

Sine Function ◽

Hankel Determinant ◽

Coefficient Problems ◽

Logarithmic Coefficients ◽

Symmetric Points

In this paper, some coefficient problems for starlike analytic functions with respect to symmetric points are considered. Bounds of several coefficient functionals for functions belonging to this class are provided. The main aim of this paper is to find estimates for the following: coefficients, logarithmic coefficients, some cases of the generalized Zalcman coefficient functional, and some cases of the Hankel determinant.

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The second Hankel determinant for strongly convex and Ozaki close-to-convex functions

Annali di Matematica Pura ed Applicata (1923 -) ◽

10.1007/s10231-021-01089-3 ◽

2021 ◽

Author(s):

Young Jae Sim ◽

Adam Lecko ◽

Derek K. Thomas

Keyword(s):

Unit Disk ◽

Convex Functions ◽

Univalent Functions ◽

Inverse Function ◽

Invariance Property ◽

Hankel Determinant ◽

Sharp Bounds ◽

Strongly Convex Functions ◽

Strongly Convex ◽

Second Hankel Determinant

AbstractLet f be analytic in the unit disk $${\mathbb {D}}=\{z\in {\mathbb {C}}:|z|<1 \}$$ D = { z ∈ C : | z | < 1 } , and $${{\mathcal {S}}}$$ S be the subclass of normalized univalent functions given by $$f(z)=z+\sum _{n=2}^{\infty }a_n z^n$$ f ( z ) = z + ∑ n = 2 ∞ a n z n for $$z\in {\mathbb {D}}$$ z ∈ D . We give sharp bounds for the modulus of the second Hankel determinant $$ H_2(2)(f)=a_2a_4-a_3^2$$ H 2 ( 2 ) ( f ) = a 2 a 4 - a 3 2 for the subclass $$ {\mathcal F_{O}}(\lambda ,\beta )$$ F O ( λ , β ) of strongly Ozaki close-to-convex functions, where $$1/2\le \lambda \le 1$$ 1 / 2 ≤ λ ≤ 1 , and $$0<\beta \le 1$$ 0 < β ≤ 1 . Sharp bounds are also given for $$|H_2(2)(f^{-1})|$$ | H 2 ( 2 ) ( f - 1 ) | , where $$f^{-1}$$ f - 1 is the inverse function of f. The results settle an invariance property of $$|H_2(2)(f)|$$ | H 2 ( 2 ) ( f ) | and $$|H_2(2)(f^{-1})|$$ | H 2 ( 2 ) ( f - 1 ) | for strongly convex functions.

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Third Hankel determinants for two classes of analytic functions with real coefficients

Forum Mathematicum ◽

10.1515/forum-2021-0014 ◽

2021 ◽

Vol 33 (4) ◽

pp. 973-986

Author(s):

Young Jae Sim ◽

Paweł Zaprawa

Keyword(s):

Analytic Functions ◽

Univalent Functions ◽

Upper Bounds ◽

Hankel Determinant ◽

Lower And Upper Bounds ◽

Hankel Determinants ◽

The Third ◽

Typically Real ◽

Class Of Functions ◽

Typically Real Functions

Abstract In recent years, the problem of estimating Hankel determinants has attracted the attention of many mathematicians. Their research have been focused mainly on deriving the bounds of H 2 , 2 {H_{2,2}} or H 3 , 1 {H_{3,1}} over different subclasses of 𝒮 {\mathcal{S}} . Only in a few papers third Hankel determinants for non-univalent functions were considered. In this paper, we consider two classes of analytic functions with real coefficients. The first one is the class 𝒯 {\mathcal{T}} of typically real functions. The second object of our interest is 𝒦 ℝ ⁢ ( i ) {\mathcal{K}_{\mathbb{R}}(i)} , the class of functions with real coefficients which are convex in the direction of the imaginary axis. In both classes, we find lower and upper bounds of the third Hankel determinant. The results are sharp.

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The Sharp Bound of the Hankel Determinant of the Third Kind for Starlike Functions with Real Coefficients

Mathematics ◽

10.3390/math7080721 ◽

2019 ◽

Vol 7 (8) ◽

pp. 721 ◽

Cited By ~ 1

Author(s):

Oh Sang Kwon ◽

Young Jae Sim

Keyword(s):

Analytic Functions ◽

Starlike Functions ◽

Sharp Bound ◽

Hankel Determinant ◽

The Third

Let SR * be the class of starlike functions with real coefficients, i.e., the class of analytic functions f which satisfy the condition f ( 0 ) = 0 = f ′ ( 0 ) − 1 , Re { z f ′ ( z ) / f ( z ) } > 0 , for z ∈ D : = { z ∈ C : | z | < 1 } and a n : = f ( n ) ( 0 ) / n ! is real for all n ∈ N . In the present paper, it is obtained that the sharp inequalities − 4 / 9 ≤ H 3 , 1 ( f ) ≤ 3 / 9 hold for f ∈ SR * , where H 3 , 1 ( f ) is the third Hankel determinant of order 3 defined by H 3 , 1 ( f ) = a 3 ( a 2 a 4 − a 3 2 ) − a 4 ( a 4 − a 2 a 3 ) + a 5 ( a 3 − a 2 2 ) .

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Exceptional solutions to the Painlevé VI equation associated with the generalized Jacobi weight

Random Matrices Theory and Application ◽

10.1142/s2010326317500034 ◽

2017 ◽

Vol 06 (01) ◽

pp. 1750003

Author(s):

Shulin Lyu ◽

Yang Chen

Keyword(s):

Asymptotic Expansions ◽

Hankel Determinant ◽

Generalized Jacobi Weight ◽

Jacobi Weight ◽

Special Cases ◽

Painlevé Vi Equation

We consider the generalized Jacobi weight [Formula: see text], [Formula: see text]. As is shown in [D. Dai and L. Zhang, Painlevé VI and Henkel determinants for the generalized Jocobi weight, J. Phys. A: Math. Theor. 43 (2010), Article ID:055207, 14pp.], the corresponding Hankel determinant is the [Formula: see text]-function of a particular Painlevé VI. We present all the possible asymptotic expansions of the solution of the Painlevé VI equation near [Formula: see text] and [Formula: see text] for generic [Formula: see text]. For four special cases of [Formula: see text] which are related to the dimension of the Hankel determinant, we can find the exceptional solutions of the Painlevé VI equation according to the results of [A. Eremenko, A. Gabrielov and A. Hinkkanen, Exceptional solutions to the Painlevé VI equation, preprint (2016), arXiv:1602.04694 ], and thus give another characterization of the Hankel determinant.

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Associative spectra of graph algebras I

Journal of Algebraic Combinatorics ◽

10.1007/s10801-020-01010-w ◽

2021 ◽

Author(s):

Erkko Lehtonen ◽

Tamás Waldhauser

Keyword(s):

Catalan Numbers ◽

Graph Algebras ◽

Undirected Graphs ◽

Powers Of 2

AbstractAssociative spectra of graph algebras are examined with the help of homomorphisms of DFS trees. Undirected graphs are classified according to the associative spectra of their graph algebras; there are only three distinct possibilities: constant 1, powers of 2, and Catalan numbers. Associative and antiassociative digraphs are described, and associative spectra are determined for certain families of digraphs, such as paths, cycles, and graphs on two vertices.

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On Bazilevic functions

International Journal of Mathematics and Mathematical Sciences ◽

10.1155/s0161171287000103 ◽

1987 ◽

Vol 10 (1) ◽

pp. 79-88 ◽

Cited By ~ 9

Author(s):

Khalida I. Noor ◽

Sumayya A. Al-Bany

Keyword(s):

Unit Disc ◽

Starlike Function ◽

Hankel Determinant ◽

Bazilevic Functions

LetB(β)be the class of Bazilevic functions of typeβ(β>0). A functionf ϵ B(β)if it is analytic in the unit discEandRezf′(z)f1−β(z)gβ(z)>0, wheregis a starlike function. We generalize the classB(β)by takinggto be a function of radius rotation at mostkπ(k≥2). Archlength, difference of coefficient, Hankel determinant and some other problems are solved for this generalized class. Fork=2, we obtain some of these results for the classB(β)of Bazilevic functions of typeβ.

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Coefficient inequalities for a class of analytic functions associated with the lemniscate of Bernoulli

Boletim da Sociedade Paranaense de Matemática ◽

10.5269/bspm.v37i4.32701 ◽

2018 ◽

Vol 37 (4) ◽

pp. 83-95

Author(s):

Trailokya Panigrahi ◽

Janusz Sokól

Keyword(s):

Upper Bound ◽

Analytic Functions ◽

Hankel Determinant ◽

Lemniscate Of Bernoulli ◽

Toeplitz Determinant ◽

Second Hankel Determinant ◽

Coefficient Inequalities ◽

The Right

In this paper, a new subclass of analytic functions ML_{\lambda}^{*} associated with the right half of the lemniscate of Bernoulli is introduced. The sharp upper bound for the Fekete-Szego functional |a_{3}-\mu a_{2}^{2}| for both real and complex \mu are considered. Further, the sharp upper bound to the second Hankel determinant |H_{2}(1)| for the function f in the class ML_{\lambda}^{*} using Toeplitz determinant is studied. Relevances of the main results are also briefly indicated.

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