Akhiezer's theorem

In the mathematical field of complex analysis, Akhiezer's theorem is a result about entire functions proved by Naum Akhiezer.^[1]

Let ${\displaystyle f:ℂ\to ℂ}$ be an entire function of exponential type ${\displaystyle \tau }$, with ${\displaystyle f(x)\ge 0}$ for real ${\displaystyle x}$. Then the following are equivalent:

• There exists an entire function ${\displaystyle F}$, of exponential type ${\displaystyle \tau /2}$, having all its zeros in the (closed) upper half plane, such that

${\displaystyle f(z)=F(z)\overline{F(\stackrel{‾}{z})}}$

• One has:

${\displaystyle \sum _n|\mathrm{Im}(1/z_n)|<\mathrm{\infty }}$

where ${\displaystyle z_n}$ are the zeros of ${\displaystyle f}$.

It is not hard to show that the Fejér–Riesz theorem is a special case.^[2]

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