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A general solution of the Fekete-Szegö problem

An Erratum to this article was published on 07 March 2014

Abstract

In the paper we introduce general classes of analytic functions defined by the Hadamard product. The Fekete-Szegö problem is completely solved in these classes of functions. Some consequences of the main results for new or well-known classes of functions are also pointed out.

MSC:30C45, 30C50, 30C55.

1 Introduction

Let A ˜ denote the class of functions which are analytic in U={zC:|z|<1} and let A denote the class of functions f A ˜ normalized by f(0)= f (0)1=0. Each function fA can be expressed as

f(z)=z+ n = 2 a n z n (zU).
(1)

By S, we denote the class of functions fA, which are univalent in U.

A typical problem in geometric function theory is to study a functional made up of combinations of the coefficients of the original function. Usually, there is a parameter over which the extremal value of the functional is needed. The paper deals with one important functional of this type: the Fekete-Szegö functional. The classical Fekete-Szegö functional is defined by

Λ μ (f)= a 3 μ a 2 2 (0<μ<1)

and it is derived from the Fekete-Szegö inequality. The problem of maximizing the absolute value of the functional Λ μ in subclasses of normalized functions is called the Fekete-Szegö problem. The mathematicians who introduced the functional, M. Fekete and G. Szegö [1], were able to bound the classical functional in the class S by 1+2exp{ 2 μ 1 μ }. Later Pfluger [2] used Jenkin’s method to show that this result holds for complex μ such that Re μ 1 μ 0. Keogh and Merkes [3] obtained the solution of the Fekete-Szegö problem for the class of close-to-convex functions. Ma and Minda [4, 5] gave a complete answer to the Fekete-Szegö problem for the classes of strongly close-to-convex functions and strongly starlike functions. In the literature, there exists a large number of results about inequalities for Λ μ (f) corresponding to various subclasses of A (see, for instance, [123]).

In the paper, we consider the classes of functions which generalize these subclasses of functions.

We say that a function g A ˜ is subordinate to a function G A ˜ , and write g(z)G(z) (or simply gG), if and only if there exists a function

ωΩ:= { ω A ˜ : | ω ( z ) | | z | ( z U ) } ,

such that g=Gω. In particular, if G is univalent in U we have the following equivalence:

g(z)G(z) [ g ( 0 ) = G ( 0 ) g ( U ) G ( U ) ] .

For functions f,gA of the forms

f(z)= n = 1 a n z n andg(z)= n = 1 b n z n ,

by fg we denote the Hadamard product (or convolution) of f and g, defined by

(fg)(z)= n = 1 a n b n z n (zU).

Let α be complex parameter and let Φ=(ϕ,φ), Ψ=(ψ,χ), P=(p,q) A ˜ × A ˜ be of the form

By W α (Φ,Ψ;p) we denote the class of functions fA such that

(φf)(z)(χf)(z)0 ( z U { 0 } )

and

(1α) ϕ f φ f +α ψ f χ f p.

Moreover, let us put

It is clear that the class M α (φ;p) contains functions fA such that

(1α) z ( φ f ) ( z ) ( φ f ) ( z ) +α ( 1 + z ( φ f ) ( z ) ( φ f ) ( z ) ) p(z).

We denote by CW(Φ;P) the class of functions fA for which there exist a function g S (q) such that (φf)(z)0 (zU{0}) and

ϕ f φ g p.

Moreover, let us denote CW(Φ;p):=CW(Φ;p,p).

In particular, the classes

M α := M α ( z 1 z ; 1 + z 1 z ) , S := M 0 , S c := M 1 ,

are the well-known classes of α-convex Mocanu functions [24], starlike functions and convex functions, respectively. The class C:=W(( z ( 1 z ) 2 , z 1 z ); 1 + z 1 z ) is the well-known class of close-to convex functions with argument β=0.

The object of the paper is to solve the Fekete-Szegö problem in the defined classes of functions. Moreover, we find sharp bounds for the second and third coefficient in these classes. Some remarks depicting consequences of the main results are also mentioned.

2 The main results

The following lemmas will be required in our present investigation.

Lemma 1 [3]

If ωΩ, ω(z)= n = 1 c n z n (zU), then

The result is sharp. The functions

ω(z)=z, ω a (z)=z z + a 1 + a ¯ z ( z U , | a | < 1 )

are the extremal functions.

Theorem 1 Let

(1α)( β k α k )+α( δ k γ k )0(k=2,3).

If f W α (Φ,Ψ;p), then

(2)
(3)
(4)

where

(5)
(6)

The results are sharp.

Proof Let f W α (Φ,Ψ;p). Then there exists a function ωΩ, ω(z)= n = 1 c n z n (zU), such that

(1α) ϕ f φ f +α ψ f χ f =pω.
(7)

It is easy to verify that

(8)
(9)

where

Thus, by (7), we have

(10)
(11)

which by Lemma 1 gives sharp estimation (2). Let μ be a complex number. Then, by (10) and (11) we obtain

a 3 μ a 2 2 = p 1 ( 1 α ) ( β 3 α 3 ) + α ( δ 3 γ 3 ) { c 2 γ c 1 2 } ,

where γ is defined by (6). Thus, by Lemma 1, we have (4). Let functions f 1 , f 2 A satisfy the conditions

Then the functions belong to the class W α (Φ,Ψ;p) and they realize the equality in the estimation (4). Thus, the results are sharp. Putting μ=0 in (4) we get the sharp estimation (3). □

Theorem 2 Let α 1 2 ,1. If f M α (φ,p), then

where

β= p 2 p 1 + ( 1 + 3 α ) ( 1 + α ) 2 p 1 ,γ= 2 ( 1 + 2 α ) α 3 p 1 ( 1 + α ) 2 α 2 2 μβ.

The results are sharp.

Proof Let f M α (φ,p)= W α (Φ,Ψ;p), where

χ(z)=ϕ(z)=z φ (z),ψ(z)=z ( z φ ( z ) ) (zU).

Since

β n = γ n =n α n , δ n = n 2 α n (n=2,3),

the results follow from Theorem 1. □

If we put α=0 in Theorem 1, then we obtain the following theorem.

Theorem 3 Let β k α k (k=2,3). If fW(Φ;p), then

where

β= p 2 p 1 + α 2 p 1 β 2 α 2 ,γ= β 3 α 3 ( β 2 α 2 ) 2 p 1 μβ.

The results are sharp.

Theorem 4 Let β 2 β 3 0. If fCW(Φ;P), then

(12)
(13)
(14)

where

(15)
(16)

The results (12) and (13) are sharp for A μ B μ 0 and A 0 B 0 0, respectively.

Proof Let fCW(Φ;P). Then there exists a function g S (q) and functions ω,ηΩ,

ω(z)= n = 1 c n z n ,η(z)= n = 1 d n z n (zU),

such that

ϕ f φ g =pω, z g ( z ) g ( z ) =(qη)(z)(zU).
(17)

Thus, by (8), we have

(18)
(19)

and by Lemma 1, we obtain the sharp estimation (14). Let μ be a complex number. Then, by (18), (19) and Lemma 1 we have

2| β 3 || a 3 μ a 2 2 |(AC)| d 1 | 2 +(BC)| c 1 | 2 +2C| d 1 || c 1 |+D,
(20)

or equivalently

2| β 3 || a 3 μ a 2 2 |A| d 1 | 2 +B| c 1 | 2 C ( | d 1 | | c 1 | ) 2 +D,
(21)

where A= A μ , B= B μ , C= C μ , D are defined by (15) and (16). Thus, we obtain

2| β 3 || a 3 μ a 2 2 |A| d 1 | 2 +B| c 1 | 2 +D,
(22)

and, in consequence, by Lemma 1 we have (12). It is easy to verify that the equality in (22) is attained by choosing c 1 = d 1 =1, c 2 = d 2 =0 if A0, B0 or c 1 = d 1 =0, c 2 = d 2 =1 if A0, B0. Therefore, we consider functions f 1 , f 2 A such that

( ϕ f 1 ) ( z ) ( φ g ) ( z ) =p(z), z g ( z ) g ( z ) =q(z)(zU)

and

( ϕ f 2 ) ( z ) ( φ g ) ( z ) =p ( z 2 ) , z g ( z ) g ( z ) =p ( z 2 ) (zU),

respectively. Then the functions belong to the class CW(Φ;p) and they realize the equality in the estimation (12) for AB0. Putting μ=0 in (12), we get the sharp estimation (13). □

The following theorem gives the complete sharp estimation of the Fekete-Szegö functional in the class CW(Φ;P).

Theorem 5 Let β 2 β 3 0. If fCW(Φ;P), then

| a 3 μ a 2 2 |{ 1 2 | β 3 | ( A + B + D ) if 0 A C 0 B C if ( A C B C ) , D 2 | β 3 | if A 0 B 0 , 1 2 | β 3 | ( D + B C + C 2 C A ) if A < 0 B C , 1 2 | β 3 | ( D + A C + C 2 C B ) if B < 0 A C ,
(23)

where A= A μ , B= B μ , C= C μ , D are defined by (15) and (16). The result is sharp.

Proof From Theorem 4, we have sharp estimation (23) for AB0. Let now AC and B<0. Then, by (20) and Lemma 1 we have

2| β 3 || a 3 μ a 2 2 |v ( | c 1 | ) ,

where

v(x):=(CB) x 2 +2Cx+(AC)+D.

Simply calculations give that the function v attains a maximum in the interval [0,1] at the point x= C C B 1. Thus, we have (23) for AC and B<0. Moreover, the equality in (20) is attained by choosing the functions η(z)=z, ω(z)=z z + a 1 + a ¯ z , for a= C C B , i.e. c 1 = C C B , d 1 =1 and c 2 =1|a | 2 , d 2 =0. Therefore, the result is sharp for AC and B<0.

Next, let A<0 and CB. Then, by (20) and Lemma 1 we have

2| β 3 || a 3 μ a 2 2 | v ˜ ( | d 1 | ) ,

where

v ˜ (x):=(CA) x 2 +2Cx+(BC)+D.

Since the function v ˜ attains a maximum in the interval [0,1] at the point x= C C A 1, we have the estimation (23) for A<0 and CB. The equality in (20) is attained by choosing the functions ω(z)=z, η(z)=z z + a 1 + a ¯ z , for a= C C A , i.e. c 1 =1, d 1 = C C A and c 2 =0, d 2 =1|a | 2 .

Finally, let us assume (0ACB0)(0BCA0). Then, by (20) we have

2| β 3 || a 3 μ a 2 2 |F ( | c 1 | , | d 1 | ) ,
(24)

where

F(x,y)=(CA) x 2 (CB) y 2 +2Cxy+D.

Since F is the continuous function on T:=[0,1]×[0,1], by (24) we have

2| β 3 || a 3 μ a 2 2 |maxF(T)=maxF(TK),
(25)

where K is the set of critical points of the function F in T. It is easy to verify that

KT={ if  C 2 ( C A ) ( C B ) A = C , { ( x , y ) int T : x = C C A y } if  C 2 = ( C A ) ( C B ) A C .

If C 2 =(AC)(BC)0, then

F ( C C A y , y ) = C 2 ( C A ) ( C B ) A C y 2 +D=D ( y [ 0 , 1 ] ) .

Moreover, we have

Thus, we obtain

maxF(TK)=A+B+D,

which by (25) gives (23) for (0ACB0)(0BCA0). The equality in (24) is attained by choosing c 1 = d 1 =1 and c 2 = d 2 =0. Therefore, the result is sharp and the proof is completed. □

Putting μ=0 in Theorem 5 we obtain the following theorem.

Theorem 6 Let β 2 β 3 0. If fCW(Φ;P), then

| a 3 |{ 1 2 | β 3 | ( A + B + D ) if 0 A C 0 B C if ( A C B C ) , D 2 | β 3 | if A 0 B 0 , 1 2 | β 3 | ( D + B C + C 2 C A ) if A < 0 B C , 1 2 | β 3 | ( D + A C + C 2 C B ) if B < 0 A C ,

where A= A 0 , B= B 0 , C= C 0 , D are defined by (15) and (16). The result is sharp.

3 Applications

If we put α=1 and α=0 in Theorem 2, then we obtain the following two corollaries.

Corollary 1 Let α 2 α 3 0. If f S c (φ,p), then

where

γ= 3 α 3 p 1 2 α 2 2 μ p 1 p 2 p 1 .

The results are sharp.

Corollary 2 Let α 2 α 3 0. If f S (φ,p), then

where

γ=2 α 3 p 1 α 2 2 μ p 1 p 2 p 1 .

The results are sharp.

Choosing the function p in Theorems 1-6, we can obtain several new results.

Let a, b be complex number, |b|<1, ab, and let

p(z)= 1 + a z 1 + b z (zU).

It is clear, that

p(z)=1+(ab)zb(ab) z 2 +(zU).

Thus, by Theorems 1-3 and 5, we obtain the following four corollaries.

Corollary 3 Let (1α)( β k α k )+α( δ k γ k )0 (k=2,3). If f W α (Φ,Ψ; 1 + a z 1 + b z ), then

where

The results are sharp.

Corollary 4 Let α 1 2 ,1. If f M α (φ, 1 + a z 1 + b z ), then

where

β=b+ ( 1 + 3 α ) ( 1 + α ) 2 (ab),γ= 2 ( 1 + 2 α ) ( a b ) α 3 ( 1 + α ) 2 α 2 2 μβ.

The results are sharp.

Corollary 5 Let β k α k (k=2,3). If fW(Φ; 1 + a z 1 + b z ), then

where

β=b+ ( a b ) α 2 β 2 α 2 ,γ= ( β 3 α 3 ) ( a b ) ( β 2 α 2 ) 2 μβ.

The results are sharp.

Corollary 6 Let β 2 β 3 0. If fCW(Φ; 1 + a z 1 + b z ), then

| a 3 μ a 2 2 |{ | b a | 2 | β 3 | ( D + A + B ) if 0 A C 0 B C if ( A C B C ) , | b a | 2 | β 3 | D if A 0 B 0 , | b a | 2 | β 3 | ( D + B C + C 2 C A ) if A < 0 B C , | b a | 2 | β 3 | ( D + A C + C 2 C B ) if B < 0 A C ,

where

The result is sharp.

Let 0<θ1 and let

p(z)= ( 1 + z 1 z ) θ (zU).

It is easy to verify, that

p(z)=1+2θz+θ(θ+1) z 2 +(zU).

Thus, by Theorems 1-3 and 5, we obtain the following four corollaries.

Corollary 7 Let (1α)( β k α k )+α( δ k γ k )0 (k=2,3). If f W α (Φ,Ψ; ( 1 + z 1 z ) θ ), then

where

The results are sharp.

Corollary 8 Let α 1 2 ,1. If f M α (φ, ( 1 + z 1 z ) θ ), then

where

β= 1 + θ 2 + 2 ( 1 + 3 α ) ( 1 + α ) 2 θ,γ= 4 ( 1 + 2 α ) θ α 3 ( 1 + α ) 2 α 2 2 μβ.

The results are sharp.

Corollary 9 Let β k α k (k=2,3). If fW(Φ; ( 1 + z 1 z ) θ ), then

where

β= 1 + θ 2 + 2 α 2 θ β 2 α 2 ,γ= 2 ( β 3 α 3 ) θ ( β 2 α 2 ) 2 μβ.

The results are sharp.

Corollary 10 Let β 2 β 3 0. If fCW(Φ; ( 1 + z 1 z ) θ ), then

| a 3 μ a 2 2 |{ θ | β 3 | ( D + A + B ) if 0 A C 0 B C if ( A C B C ) , θ D | β 3 | if A 0 B 0 , θ | β 3 | ( D + B C + C 2 C A ) if A < 0 B C , θ | β 3 | ( D + A C + C 2 C B ) if B < 0 A C ,

where

The result is sharp.

Let Ω k ={u+iv:u>k ( u 1 ) 2 + v 2 }, k>0. Note that Ω k is the convex domain contained in the right half plane, with 1 Ω k . More precisely, it is the elliptic domain for k>1, the hyperbolic domain for 0<k<1 and the parabolic domain for k=1.

Let us denote by h k the univalent function, which maps the unit disc U onto the conic domain Ω k with h k (0)=1. Obviously, the function h k is convex in U. It is easy to check that fW(Φ; h k ) if and only if

Re ( ( ϕ f ) ( z ) ( φ g ) ( z ) ) >k| ( ϕ f ) ( z ) ( φ g ) ( z ) 1|(zU).

The following lemma gives coefficients estimates for the function.

Lemma 2 [13]

Let h k =1+ n = 1 p n z n (zU). Then

p 1 = { 2 D 2 ( k ) 1 k 2 for 0 k < 1 , 8 π 2 for k = 1 , π 2 4 t ( 1 + t ) ( k 2 1 ) K 2 ( t ) for k > 1 , p 2 = { D 2 ( k ) + 2 3 p 1 for 0 k < 1 , 2 3 p 1 for k = 1 , 4 ( t 2 + 6 t + 1 ) K 2 ( t ) π 2 24 t ( 1 + t ) K 2 ( t ) p 1 for k > 1 ,

where D(k)= 2 π arcsink and K 2 (t) is the complete elliptic integral of first kind.

Using Lemma 1 in Theorems 1-5 we obtain the solutions of the Fekete-Szegö problem for the classes W α (Φ,Ψ; h k ), M α (φ, h k ), W α (Φ; h k ), CW α (Φ; h k ).

Remark 1 The classes W α (Φ,Ψ;h), M α (φ,h), CW α (Φ;P) reduced to well-known subclasses by judicious choices of the parameters; see, for example [128]. In particular, they generalize several well-known classes defined by linear operators, which were investigated in earlier works. Also, the obtained results generalize several results obtained in these classes of functions.

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Acknowledgements

Dedicated to Professor Hari M Srivastava.

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An erratum to this article is available at http://dx.doi.org/10.1186/1687-2770-2014-50.

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Dziok, J. A general solution of the Fekete-Szegö problem. Bound Value Probl 2013, 98 (2013). https://doi.org/10.1186/1687-2770-2013-98

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