I have a complicated Integral, in five+one dimensions. The integrand
have a trigonometric dependance
on five angles, and the sixth dimension is a radius going from 0 to
infinity.
I use vegas to integrate across the angular dependencies, where the
function to be integrated is computed
by computing the fourier integral with the angles held constant.
How precise should I set the relative and absolute error bounds in
the fourier integral, to allow vegas to return
as accurate results as feasible. Currently I use 1e-4 as both
relative and absolute error bounds.
-------------------------------------
This sig is dedicated to the advancement of Nuclear Power
Tommy Nordgren
[EMAIL PROTECTED]
_______________________________________________
Help-gsl mailing list
[email protected]
http://lists.gnu.org/mailman/listinfo/help-gsl
