Jinc Function

$\begin{figure}\begin{center}\BoxedEPSF{Jinc.epsf scaled 750}\end{center}\end{figure}$

The jinc function is defined as

$\begin{displaymath} \mathop{\rm jinc}\nolimits (x)\equiv {J_1(x)\over x}, \end{displaymath}$

where

is a Bessel Function of the First Kind, and satisfies $\lim_{x\to 0}\mathop{\rm jinc}\nolimits (x)=1/2$ . The Derivative of the jinc function is given by

$\begin{displaymath} \mathop{\rm jinc}\nolimits '(x)=-{J_2(x)\over x}. \end{displaymath}$

The function is sometimes normalized by multiplying by a factor of 2 so that $\mathop{\rm jinc}\nolimits (0)=1$ (Siegman 1986, p. 729).

References

Siegman, A. E. Lasers. Sausalito, CA: University Science Books, 1986.