This question is kind of follow up to my previous question here GSL integration behaves strange
Because of the scaling
x -> (1-t)/t causing undesired answers in the infinite integration method
gsl_integration_qagi I am now resorted to using the integration over a finite support. What I now do is this:
I have a (discrete) series
S of real numbers, which I convolute (each) with a given exponential function
exp(-t/T) ... T = decay constant
I choose the support for integration to be
(min(S) - 10*T, max(S) + 10*T) so that I cover most of the "significant" contribution from the function.
Integrating over this support using
gsl_integration_qag takes over a few seconds, while gsl_integration_qagi` (infinite support) hardly a few milliseconds but produces wrong results. Does anyone know a reason?
gsl_integration_qag works well if the convolution is Gaussian instead of exponential.
Thanks in advance, Nikhil