On Certain Multivalent Starlike or Convex Functions with Negative Coefficients

Neslihan Uyanik; Erhan Deniz; Ekrem Kadioǧlu; Shigeyoshi Owa

doi:10.1155/2010/751721

Research Article
Open Access

On Certain Multivalent Starlike or Convex Functions with Negative Coefficients

Neslihan Uyanik¹,
Erhan Deniz²,
Ekrem Kadioǧlu² and
Shigeyoshi Owa³Email author

Journal of Inequalities and Applications20102010:751721

https://doi.org/10.1155/2010/751721

Received: 2 April 2010
Accepted: 3 June 2010
Published: 15 June 2010

Abstract

By means of a differential operator, we introduce and investigate some new subclasses of -valently analytic functions with negative coefficients, which are starlike or convex of complex order. Relevant connections of the definitions and results presented in this paper with those obtained in several earlier works on the subject are also pointed out.

Keywords

Differential Operator
Convex Function
Series Expansion
Simple Computation
Open Unit

1. Introduction

Let

denote the class of functions of the following form:

(1.1)

which are analytic and multivalent in the open unit dics

Let

denote the

th-order ordinary differential operator for a function

, that is,

(1.2)

where ;

Next, we define the differential operator

as

(1.3)

In view of (1.3), it is clear that

(1.4)

If we take and for , then become the differential operator defined by S l gean [1].

Finally, in terms of a differential operator

defined by (1.3) above, let

denote the subclass of

consisting of functions

which satisfy the following inequality:

(1.5)

where , , , ; ;

For

,

, and

, we define the next subclasses of

(1.6)

where ; ; ;

Remark 1.1.

( ) was studied by Nasr and Aouf [2] (also see Bulboac et al. [3]).

( ) and , were introduced by Srivastava et al. [4].

( ) and , were introduced by Silverman [5].

( ) and were introduced by Parvathan and Ponnusanny [6, pages 163-164].

( ) For and , the classes , , and are closely related with , , and which are defined by Owa and Sălăgean in [7].

In this paper we give relationships between the classes of , , and In the particular case when and , , and , we obtain the same results as in [8].

2. Main Results

Our main results are contained in

Theorem 2.1.

Let , and let ; then

(1)

(2)

(3)if

, then

(2.1)

(4)if , then ;

(5)if , then

Proof.

(

) Let

We prove that

(2.2)

If

has the series expansion

(2.3)

then

(2.4)

We use the fact that

for

and

these imply

(2.5)

for

From (2.4) and (2.5), we deduce

(2.6)

By using the definition of

from this last inequality we, obtain (2.2) which implies

(2.7)

hence

(

) Let

be in

Then (2.7) holds and, by using (2.3), this is equivalent to

(2.8)

For

if

, from (2.8) we obtain

(2.9)

which is equivalent to

(2.10)

Then multiplying the relation last inequality with we obtain

( ) if is a real positive number, then the definitions of and are equivalent, hence By using ( ) and ( ) from this theorem, we obtain ( ).

( ) We have the following two cases.

Case 1.

Let

be defined by

(2.11)

and let

We have

(2.12)

or

(2.13)

and then (see the definition of ).

Let now

(2.14)

Then, by a simple computation and by using the fact that

(2.15)

we obtain

(2.16)

where

,

, and

(2.17)

For

we, have

where

is the disc with the center

(2.18)

and the radius

(2.19)

We have where and we deduce that for all does not hold.

We have obtained that for but and in this case

Case 2.

We consider the function defined by (2.11) for In this case, the inequality (2.13) holds too and this implies that

We also obtain that like in Case 1.

(

) Let

be given by (2.11), where

and

Then

(2.20)

which implies that

(2.21)

We have

(2.22)

where is given by (2.17).

From

where

and

are given by (2.18) and (2.19), we obtain

(2.23)

If

and

, then

(2.24)

and if

(2.25)

then (2.24) also holds. By combining (2.24) with (2.23) and the definition of

, we obtain that

(2.26)

Declarations

Appendix

In this paper, we discuss the class

of analytic functions with negative coefficients. Let us consider the functions

given by

(A.1)

which are analytic in

. For such a function

, we say that

if it satisfies

(A.2)

for some complex number

with

.If we define the function

for

by

(A.3)

then we know that

is analytic in

,

, and

. Thus

is the Carathéodory function. Since the extremal function for the Carathéodory function

is given by

(A.4)

we can write

(A.5)

This shows us that

(A.6)

Noting that

(A.7)

we see that

(A.8)

that is,

(A.9)

It follows from the above that

(A.10)

Calculating the above integrations, we have that

(A.11)

Therefore, we obtain that

(A.12)

that is,

(A.13)

Consequently, the function

defined by the above is the extremal function for the class

. But our class

is defined with analytic functions

with negative coefficients. Thus we do not know how we can consider the extremal function for this class.

Authors’ Affiliations

(1)

Department of Mathematics, Kazim Karabekir Faculty of Education, Atatürk University, Erzurum, 25240, Turkey

(2)

Department of Mathematics, Science and Art Faculty, Atatürk University, Erzurum, 25240, Turkey

(3)

Department of Mathematics, Kinki University, Higashi-Osaka, Osaka 577-8502, Japan

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