Correction/Addendum to “The extremal function for the complex ball for generalized notions of degree and multivariate polynomial approximation” (Ann. Polon. Math. 123 (2019), 171–195)

Letf(z)=∑k=0∞akzk,a0≠0be analytic in the unit disc. Any infinite complex vectorθ=(θ0,θ1,θ2,…)such that|θk|=1,k=0,1,2,…, induces a functionfθ(z)=∑k=0∞akθkzkwhich is still analytic in the unit disc.In this paper we study the problem of maximizing thep-means:∫02π|fθ(reiϕ)|pdϕover all possible vectorsθand for values ofrclose to0and for allp<2.It is proved that a maximizing function isf1(z)=−|a0|+∑k=1∞|ak|zkand thatrcould be taken to be any positive number which is smaller than the radius of the largest disc centered at the origin which can be inscribed in the zero sets off1. This problem is originated by a well known majorant problem for Fourier coefficients that was studied by Hardy and Littlewood.One consequence of our paper is that forp<2the extremal function for the Hardy-Littlewood problem should be−|a0|+∑k=1∞|ak|zk.We also give some applications to derive some sharp inequalities for the classes of Schlicht functions and of functions of positive real part.

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The extremal function for partial bipartite tilings

European Journal of Combinatorics ◽

10.1016/j.ejc.2011.09.026 ◽

2012 ◽

Vol 33 (5) ◽

pp. 807-815 ◽

Cited By ~ 6

Author(s):

Codruţ Grosu ◽

Jan Hladký

Keyword(s):

Extremal Function ◽

The Extremal Function

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Unpredictability of the coefficients of m-fold symmetric bi-starlike functions

International Journal of Mathematics ◽

10.1142/s0129167x14500645 ◽

2014 ◽

Vol 25 (07) ◽

pp. 1450064 ◽

Cited By ~ 3

Author(s):

Samaneh G. Hamidi ◽

Jay M. Jahangiri

Keyword(s):

Extremal Function ◽

Univalent Functions ◽

Starlike Functions ◽

Square Root ◽

Koebe Function ◽

The Extremal Function

In 1984, Libera and Zlotkiewicz proved that the inverse of the square-root transform of the Koebe function is the extremal function for the inverses of odd univalent functions. The purpose of this paper is to point out that this is not the case for the m-fold symmetric bi-starlike functions by demonstrating the unpredictability of the coefficients of such functions.

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Generalized Order and Best Approximation of Entire Function in -Norm

International Journal of Mathematics and Mathematical Sciences ◽

10.1155/2010/360180 ◽

2010 ◽

Vol 2010 ◽

pp. 1-15 ◽

Cited By ~ 5

Author(s):

Mohammed Harfaoui

Keyword(s):

Entire Function ◽

Polynomial Approximation ◽

Best Approximation ◽

Extremal Function ◽

Entire Functions ◽

Complex Variables ◽

Several Complex Variables ◽

Best Polynomial Approximation ◽

Growth Of Entire Functions

The aim of this paper is the characterization of the generalized growth of entire functions of several complex variables by means of the best polynomial approximation and interpolation on a compact with respect to the set , where is the Siciak extremal function of a -regular compact .

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Convolutions of prestarlike functions

International Journal of Mathematics and Mathematical Sciences ◽

10.1155/s0161171283000034 ◽

1983 ◽

Vol 6 (1) ◽

pp. 59-68 ◽

Cited By ~ 2

Author(s):

O. P. Ahuja ◽

H. Silverman

Keyword(s):

Unit Disk ◽

Extremal Function ◽

Extreme Points ◽

Distortion Theorems ◽

The Extremal Function ◽

Class Of Functions

The convolution of two functionsf(z)=∑n=0∞anznandg(z)=∑n=0∞bnzndefined as(f∗g)(z)=∑n=0∞anbnzn. Forf(z)=z−∑n=2∞anznandg(z)=z/(1−z)2(1−γ), the extremal function for the class of functions starlike of orderγ, we investigate functionsh, whereh(z)=(f∗g)(z), which satisfy the inequality|(zh′/h)−1|/|(zh′/h)+(1-2α)|<β,0≤α<1,0<β≤1for allzin the unit disk. Such functionsfare said to beγ-prestarlike of orderαand typeβ. We characterize this family in terms of its coefficients, and then determine extreme points, distortion theorems, and radii of univalence, starlikeness, and convexity. All results are sharp.

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Note on Schiffer’s Variation in the Class of Univalent Functions in the Unit Disc

Nagoya Mathematical Journal ◽

10.1017/s0027763000026696 ◽

1968 ◽

Vol 32 ◽

pp. 273-276

Author(s):

Kikuji Matsumoto

Keyword(s):

Unit Disc ◽

Extremal Function ◽

Univalent Functions ◽

The Real ◽

Maximum Value ◽

The Extremal Function

Let S denote the class of univalent functions f(z) in the unit disc D: | z | < 1 with the following expansion: (1) f(z) = z + a2z2 + a3z3 + · · · · anzn + · ··.We denote by fn(z) the extremal function in S which gives the maximum value of the real part of an and by Dn the image of D under w = fn(z).

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