I want to compute numerically the following integral (I am using MATLAB)
$$\int_{\eta_0}^\infty Ai(p)dp$$ where $\eta_0=-9.0311 - 5.2141i$
What should my $\infty$ be to get the right result?
I choose $\infty$ to obey:
$(0.332i)^{1/3}N+\eta_0$
where N is a real value. At the moment I choose it to be N=80 but I am not sure on how much it has to be to be considered "infinity".
So, I am using 38.9422 +22.4833i for the upper-bound (is it a good "infinite"?) and got 9.4214E+04 - 3.7640E+05i for the integral but I don't know if this result is right or not.
An additional question: is a branch cut needed?
Find the treasures in MATLAB Central and discover how the community can help you!
Start Hunting!
Translated by 
Sie können auch eine Website aus der folgenden Liste auswählen:
Amerika
Europa
Asien-Pazifik