Internat. J. Math. & Math. Sci.
Vol. 24, No. 7 (2000) 433–435 S0161171200004634
© Hindawi Publishing Corp.
A SUBORDINATION THEOREM FOR SPIRALLIKE FUNCTIONS
SUKHJIT SINGH (Received 24 November 1999)
Abstract.We prove a subordination relation for a subclass of the class ofλ-spirallike functions.
Keywords and phrases. Convex function, spirallike function, subordinating factor sequence.
2000 Mathematics Subject Classification. Primary 30C45; Secondary 30C50.
1. Introduction. LetKdenote the usual class of convex functions. Denote bySp(λ),
−π/2< λ < π/2, the class of functionsf (z)=z+a2z2+···which are analytic inE and satisfy therein the condition
Re
eiλzf(z) f (z)
>0. (1.1)
Spacek [3] proved that members ofSp(λ), known asλspirallike functions, are univa- lent inE. In 1989, Silverman [2] proved that if
∞ n=2
1+(n−1)secλan≤1
|λ|<π 2
, (1.2)
then the functionf (z)=z+ ∞n=2anznbelongs toSp(λ). Let us denote byG(λ),the class of functionf (z)=z+ ∞n=2anznwhose coefficients satisfy the condition (1.2).
Note that G(0)is a subclass of the class of starlike functions (with respect to the origin) (see Silverman [1]).
In this paper, we prove a subordination theorem for the classG(λ). To state and prove our main result we need the following definitions and lemma.
Definition1.1. Iff (z)= ∞n=0anznandg(z)= ∞n=0bnznare analytic in|z|< r, then their Hadamard product/convolution,f∗gis the function defined by the power series
(f∗g)(z)= ∞ n=0
anbnzn. (1.3)
The functionf∗gis also analytic in|z|< r.
Definition1.2. Letf be analytic inE, ganalytic and univalent inE andf (0)= g(0). Then by the symbolf (z)≺g(z)(fsubordinate tog) inE, we shall mean that f (E)⊂g(E).
434 SUKHJIT SINGH
Definition1.3. A sequence{bn}∞1 of complex numbers is said to be a subordi- nating factor sequence if wheneverf (z)= ∞k=1akzk, a1=1 is regular, univalent and convex inE, we have
∞ k=1
bkakzk≺f (z) inE. (1.4)
Lemma1.4. The sequence{bn}∞1 is a subordinating factor sequence if and only if Re
1+2
∞ n=1
bnzn
>0, (z∈E). (1.5)
This lemma which gives a beautiful characterisation of a subordinating factor se- quence is due to Wilf [4].
2. Main theorem
Theorem2.1. Letf∈G(λ). Then 1+secλ
2(2+secλ)(f∗g)(z)≺g(z), (z∈E) (2.1) for every functiongin the classK.
In particular
Ref (z) >− 2+secλ
(1+secλ), (z∈E). (2.2)
The constant(1+secλ)/2(2+secλ)cannot be replaced by any larger one.
Takingλ=0, we obtain the following corollary.
Corollary2.2. Iff (z)=z+a2z2+ ··· is regular inE and satisfies therein the condition
∞ n=2
nan≤1, (2.3)
then for every functionginK, we have 1
3(f∗g)(z)≺g(z), (|z|<1). (2.4) In particular,Ref (z) >−3/2, z∈E. The constant1/3is best possible.
Proof of Theorem2.1. Let f (z)=z+ ∞n=2anzn be any member of the class G(λ)and letg(z)=z+ ∞n=2cnznbe any function in the classK. Then
1+secλ
2(2+secλ)(f∗g)(z)= 1+secλ 2(2+secλ)
z+
∞ n=2
ancnzn
. (2.5)
Thus, by Definition 1.3, the assertion of our theorem will hold if the sequence (1+secλ)an
2(2+secλ) ∞
n=1
(2.6) is a subordinating factor sequence, witha1=1. In view of the lemma, this will be the
A SUBORDINATION THEOREM FOR SPIRALLIKE FUNCTIONS 435 case if and only if
Re
1+2 ∞ n=1
1+secλ 2(2+secλ)anzn
>0, (z∈E). (2.7) Now
Re
1+1+secλ 2+secλ
∞ n=1
anzn
=Re
1+1+secλ
2+secλz+ 1 2+secλ
∞ n=2
(1+secλ)anzn
>
1−1+secλ
2+secλr− 1 2+secλ
∞ n=2
1+(n−1)secλanrn
(because 1+secλ≤1+(n−1)secλfor alln≥2,|λ|< π/2)
>
1−1+secλ
2+secλr− 1 2+secλr
(|z| =r )
>0.
(2.8)
Thus (2.7) holds true in E. This proves the first assertion. That Ref (z) > −(2+ secλ)/(1+secλ)forf∈G(λ)follows by takingg(z)=z/(1−z)in (2.1). To prove the sharpness of the constant(1+secλ)/2(2+secλ), we consider the functionf0defined byf0(z)=z−(1/(1+secλ))z2(|λ|< π/2), which is a member of the classG(λ). Thus from the relation (2.1) we obtain
1+secλ
2(2+secλ)f0(z)≺ z
1−z. (2.9)
It can be easily verified that
|z|≤1minRe
1+secλ 2(2+secλ)f0(z)
= −1
2. (2.10)
This shows that the constant(1+secλ)/2(2+secλ)is best possible.
Acknowledgement. This paper was presented at the 62nd annual conference of the Indian Mathematical Society held at IIT, Kanpur from December 22–25, 1996.
The author is thankful to Prof. Ram Singh, Department of Mathematics, Punjabi University, Patiala, for his help and encouragement during this work.
References
[1] H. Silverman,Univalent functions with negative coefficients, Proc. Amer. Math. Soc.51 (1975), 109–116. MR 51#5910. Zbl 311.30007.
[2] , Sufficient conditions for spiral-likeness, Int. J. Math. Math. Sci.12(1989), no. 4, 641–644. MR 90k:30024. Zbl 688.30009.
[3] L. Spacek,Contribution à la theorie des fonctions univalents, Cas. Mat. Fys.62(1932), no. 2, 12–19 (Czech). Zbl 006.06403.
[4] H. S. Wilf,Subordinating factor sequences for convex maps of the unit circle, Proc. Amer.
Math. Soc.12(1961), 689–693. MR 23#A2519. Zbl 100.07201.
Sukhjit Singh: Department of Mathematics, Sant Longowal Institute of Engineering
& Technology, Longowal-148 106(Punjab), India
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