The Journal of the Indian Mathematical Society

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On Integral Functions of Order One and of Finite Type


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1 University of Madras, India
     

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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.


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  • On Integral Functions of Order One and of Finite Type

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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.