# Can you explain this Mathematica \$Assumptions behaviour?

Consider the following three lines of Mathematica code and note that input line 1 and 3 are exactly the same (This is the smallest piece of code I found to demonstrate this behaviour).

``````>> Integrate[Exp[-a^2] Sin[2 p] ((a^2 + b^2) + b*Cos[p] + a*Sin[p]), {p, 0, 2 \[Pi]}]
0

>> \$Assumptions = {t > 0};
>> Integrate[Exp[-a^2] Sin[2 p] ((a^2 + b^2) + b*Cos[p] + a*Sin[p]), {p, 0, 2 \[Pi]}]

8/3 Sqrt[a^2+b^2] E^-a^2
``````

Note that the integral should yield 0, like in Mathematica's first answer. The assumption I enter has apparently nothing to do with the integration. Is this a bug (I use Mathematica 8.0)?

Even stranger, if I split the integral into a sum of 2 or 3 integrals, each of them yields 0. Same thing if I take parts out of the integral which do not depend on p.

For me it looks like a bug but if there is something I'm missing, please let me know.

• I can reproduce it in a fresh kernel in 8.0.4. `t` doesn't even appear in your expression, it looks like a bug. You could contact Wolfram Support with the problem, so they can fix it. Dec 2 '11 at 8:19
• I filed a bug report. Let's see what the support team is saying. Thanks. Dec 2 '11 at 9:08
• Appears to be fixed in a development Mathematica. (Am hoping it stays that way.) Dec 2 '11 at 15:27
• Got an answer from the Wolfram Support team: "It does appear that Integrate is not behaving properly, and I have forwarded an incident report to our developers with the information you provided. In addition to the workarounds you already have, I found that moving the Exp[-a^2] outside the Integrate also allows Integrate to find the correct result." Dec 3 '11 at 18:43

``````8/3 Sqrt[a^2+b^2] E^-a^2