On the growth of a composition of entire functions
https://doi.org/10.15330/cmp.9.2.181-187
Keywords:
entire function, composition of functions, generalized order
Published online:
2018-01-02
Abstract
Let $\gamma$ be a positive continuous on $[0,\,+\infty)$ function increasing to $+\infty$ and $f$ and $g$ be arbitrary entire functions of positive lower order and finite order.
In order that for $$\lim\limits_{r\to+\infty} \frac{\ln\ln\,M_{f(g)}(r)}{\ln\ln\,M_f(\exp\{\gamma(r)\})}=+\infty, \quad M_f(r)=\max\{|f(z)|:\,|z|=r\}, $$ it is necessary and sufficient that $(\ln\,\gamma(r))/(\ln\,r)\to 0$ as $r\to+\infty$. This statement is an answer to the question posed by A.P. Singh and M.S. Baloria in 1991.
Also in order that $$ \lim\limits_{r\to+\infty}\frac{\ln\ln\,M_F(r)} {\ln\ln\,M_f(\exp\{\gamma(r)\})}=0,\quad F(z)=f(g(z)), $$ it is necessary and sufficient that $(\ln\,\gamma(r))/(\ln\,r)\to \infty$ as $r\to+\infty$.
How to Cite
(1)
Sheremeta, M. On the Growth of a Composition of Entire Functions. Carpathian Math. Publ. 2018, 9, 181-187.
