The Journal of the Indian Mathematical Society

Open Access Open Access  Restricted Access Subscription Access
Open Access Open Access Open Access  Restricted Access Restricted Access Subscription Access

On Integral Functions of Order One and of Finite Type


Affiliations
1 University of Madras, India
     

   Subscribe/Renew Journal


Let f (z) be an integral function and M(r) the maximum of |f(z)| on |z|=r. The order p and type k of f (z) are defined by the relations

p=lim log logM(r)/log r; k=lim logM(r)/rp.                                (1)

If p is finite, the function f (z) is said to be of minimal, normal or maximal type according as k vanishes, is a finite positive number, or is infinite. We shall define the number l by the relation

l=lim logM(r)/rp,                                                                (2)

which might be called the lower type in contrast to k which might be termed the upper type. It is evident that l≤k.


Subscription Login to verify subscription
User
Notifications
Font Size


Abstract Views: 209

PDF Views: 0




  • On Integral Functions of Order One and of Finite Type

Abstract Views: 209  |  PDF Views: 0

Authors

V. Ganapathy Iyer
University of Madras, India

Abstract


Let f (z) be an integral function and M(r) the maximum of |f(z)| on |z|=r. The order p and type k of f (z) are defined by the relations

p=lim log logM(r)/log r; k=lim logM(r)/rp.                                (1)

If p is finite, the function f (z) is said to be of minimal, normal or maximal type according as k vanishes, is a finite positive number, or is infinite. We shall define the number l by the relation

l=lim logM(r)/rp,                                                                (2)

which might be called the lower type in contrast to k which might be termed the upper type. It is evident that l≤k.