s15aef calculates an approximate value for the error function
Let
be the root of the equation
(then
). For
the value of
is based on the following rational Chebyshev expansion for
:
where
denotes a rational function of degree
in the numerator and
in the denominator.
For
the value of
is based on a rational Chebyshev expansion for
: for
the value is based on the expansion
and for
it is based on the expansion
For each expansion, the specific values of
and
are selected to be minimal such that the maximum relative error in the expansion is of the order
, where
is the maximum number of decimal digits that can be accurately represented for the particular implementation (see
x02bef).
For
there is a danger of setting underflow in
(the value of
is given in the
Users' Note for your implementation). For
,
s15aef returns
; for
it returns
.
There are no failure exits from
s15aef. The argument
ifail has been included for consistency with other routines in this chapter.
Background information to multithreading can be found in the
Multithreading documentation.
Internal changes have been made to this routine as follows:
For details of all known issues which have been reported for the
NAG Library please refer to the
Known Issues.