I'm sorry, this is perhaps not the best question for this forum.

However, it would be of enormous help if someone could evaluate this integral for me using Mathematica or similar software.

Thank you very much!

$\int_0^\infty\int_0^\infty e^{- t/\gamma}\left(t-\frac{1}{2\gamma}t^2\right) e^{-|t-t'|/\mu'}e^{- t'/\gamma}\left(t'-\frac{1}{2\gamma}t'^2\right) dtdt'$


closed as off-topic by user296602, José Carlos Santos, Professor Vector, Math Lover, zipirovich Nov 28 '17 at 20:09

This question appears to be off-topic. The users who voted to close gave this specific reason:

  • "This question is not about mathematics, within the scope defined in the help center." – Community, José Carlos Santos, Professor Vector, Math Lover, zipirovich
If this question can be reworded to fit the rules in the help center, please edit the question.

  • $\begingroup$ This seems like a question for Mathematica SE instead. Voting to close. $\endgroup$ – user296602 Nov 28 '17 at 18:32

Assuming $\gamma,\mu>0$, it is $$ \frac{\gamma^5\mu(\gamma+3\mu)}{8(\gamma+\mu)^3} $$

  • $\begingroup$ Your answer is correct, however, could you tell me a bit more how you obtained it? If using Mathematica, could you provide a code? Sorry, about the late question, but this problem has just come up again! $\endgroup$ – adamG May 21 '18 at 12:39

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