On the growth of analytic functions (Q923756)

A well known theorem on functions of exponential type that are bounded on the real axis provides a bound for \(| f|\) on horizontal lines and a bound for \(| f'|\) on the real axis. The author finds extensions to entire functions of order \(\rho\), greater than 1. If f is regular for Im \(z\geq 0\), if \[ | f(z)| \leq A \exp (\tau | z|^{\rho})\text{ and } | f(x)| <M \exp (-c| x|^{\rho}), \] then for each \(c'<c\) we have \[ | f(x+iy)| \leq \max (A,M)\exp (ky^{\rho}-c'| x|^{\rho})\text{ for } y\geq 0, \] with a k that is an explicit function of \(\tau,c,c'\), and \(\rho\). In addition, \(| f'(x)| \leq C \exp (-c'| x|^{\rho})\) with C independent of x.