For real input, ERFC is computed using rational functions, as described in “Rational Chebyshev approximations for the error function,” W. J. Cody, Math. Comp., 1969, pp. 631-638. For complex input, ERFC is computed as 1 - ERF(Z).
To find the complementary error function of 0.4 and print the result, enter:
Result = ERFC(Z)
The result is double-precision if the argument is double-precision, otherwise the result is floating-point. The result always has the same structure as Z. The ERFC function also accepts complex arguments.
The expression for which the complementary error function is to be evaluated. Z may be complex.
Thread Pool Keywords
This routine is written to make use of IDL’s thread pool, which can increase execution speed on systems with multiple CPUs. The values stored in the !CPU system variable control whether IDL uses the thread pool for a given computation. In addition, you can use the thread pool keywords TPOOL_MAX_ELTS, TPOOL_MIN_ELTS, and TPOOL_NOTHREAD to override the defaults established by !CPU for a single invocation of this routine. See Thread Pool Keywords.
Z argument accepts complex input
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