math-fun: Sinc, Zolotarev's, and Other Mathematical Utility Functions
Description
sinc(x) computes the sinc function
$s(x)=\sin(x)/x$ for $x\ne 0$ and
$s(0) = 1$, such that $s()$ is continuous, also at $x = 0$.
A..Z(x, a) computes Zolotarev's function to
the power 1-a.
Usage
sinc(x)
A..Z(x, alpha, I.alpha = 1 - alpha)
Arguments
x
numeric argument in $[0,\pi]$,
typically a vector.
alpha
parameter in (0,1].
I.alpha
must be = 1 - alpha, maybe more accurately
when alpha is very close to 1.
Value
A..Z(x,alpha) is $\tilde A_{Z}(x,\alpha)$,
defined as
$$\frac{\sin(\alpha x)^\alpha\sin((1-\alpha)x)^{1-\alpha}}{\sin(x)},\
x\in[0,\pi],$$
where $\alpha\in(0,1]$ is alpha.
Details
For more details about Zolotarev's function, see, for example, Devroye (2009).
References
Devroye, L. (2009)
Random variate generation for exponentially and polynomially tilted
stable distributions,
ACM Transactions on Modeling and Computer Simulation19,
18, 1--20.
See Also
retstable internally makes use of these functions.