# Difference between definite and indefinite integration in Mathematica?

I have noticed that mathematica chokes out on certain definite integrals, but if I do an indeifinite integration and subtract the limiting values of the resulting function, it would readily give me an answer.

Are there different algorithms to compute the definite and indefinite integrals? Is there some reason the above procedure described isn't done by Mathematica manually?

Examples:

As people in the comment asked for examples, here are two.

``````Timing[Integrate[(r - c x)/(r^2 + c^2 - (2 r) c x)^(3/2), x]]
Out:={0.010452,(-c+r x)/(r^2 Sqrt[c^2+r^2-2 c r x])}
``````

Gets the output immediately. While,

``````Integrate[(r - c x)/(r^2 + c^2 - (2 r) c x)^(3/2), {x, -1, 1}]
``````

Keeps computing and slows my old computer down. After a bit of time it returns an unneccesarily long result with a lot of cases. This is Mathematica 7. There are no singularities in this integral or running into complex numbers etc. To get the value, let's abort the computation running for about a minutes now and find the value using the fundamental theorem of calculus manually.

``````g = (r - c x)/(r^2 + c^2 - (2 r) c x)^(3/2)
l = Integrate[g, x] /. x -> -1;
u = Integrate[g, x] /. x -> 1;
u - l
Out:= (-c+r)/(r^2 Sqrt[c^2-2 c r+r^2])-(-c-r)/(r^2 Sqrt[c^2+2 c r+r^2])
FullSimplify[%]
Out:= ((-c+r)/Sqrt[(c-r)^2]+(c+r)/Sqrt[(c+r)^2])/r^2
``````

Which is actually correct. Finally, for completeness, let's compare the output and the time for the definite integral:

``````Timing[Integrate[(r - c x)/(r^2 + c^2 - (2 r) c x)^(3/2), {x, -1,
1}]]
Out:= {174.52,If[(Re[c/r+r/c]>=2||2+Re[c/r+r/c]<=0||c/r+r/c\[NotElement]Reals)&&((Im[r] Re[c]+Im[c] Re[r]<=0&&((Im[c]+Im[r]) (Re[c]+Re[r])>=0||Im[c]^3 Re[r]+Im[r] Re[c] (Im[r]^2-Re[c]^2+Re[r]^2)>=Im[c] (Im[c] Im[r] Re[c]+Re[r] (Im[r]^2 ... blah blah half a page
``````

Note the three minutes computation time and the very confused answer.

An actual example from my work, I noticed it and was puzzled but forgot about it after the deadline submission, until today when I faced the same problem again.

``````f = 1/((-I c + k^2/2 - 1/2 (a + k)^2) (I d + k^2/2 -
1/2 (-b + k)^2)) + 1/((I c + k^2/2 - 1/2 (-a + k)^2) (I c + I d +
k^2/2 - 1/2 (-a - b + k)^2)) + 1/((I d + k^2/2 -
1/2 (-b + k)^2) (I c + I d + k^2/2 -
1/2 (-a - b + k)^2)) + 1/((I c + k^2/2 - 1/2 (-a + k)^2) (-I d +
k^2/2 - 1/2 (b + k)^2)) + 1/((-I c + k^2/2 -
1/2 (a + k)^2) (-I c - I d + k^2/2 -
1/2 (a + b + k)^2)) + 1/((-I d + k^2/2 - 1/2 (b + k)^2) (-I c -
I d + k^2/2 - 1/2 (a + b + k)^2))
``````

When I tried the definite integral, I waited and waited, after several hours (true!) I finally decided to try the workaround that worked in no time:

``````fl =  Integrate[f, k] /. k -> -1 ;
fu =  Integrate[f, k] /. k -> 1 ;
F = fu - fl;
F1 = F /. {a -> .01, c -> 0, d -> 1};
``````

Please note that I am not talking about singularities as one comment suggested. `Integrate[1/x, {x, -1, 1}]` almost immediately returns `Integrate::idiv: Integral of 1/x does not converge on {-1,1}. >>` which is a perfectly reasonable output.

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The indefinite integral is solved symbolically, which has a different optimal solving method than an definite integral. What function and boundaries are you integrating? – Matthew Sep 20 '11 at 21:32
Think for example in `Integrate[1/x, {x, -1, 1}]` – Dr. belisarius Sep 20 '11 at 22:10
Using the option `GenerateConditions -> False` will normally make the definite integral behave like subtracting the limits of the indefinite integral. However, you have to be careful for the reason that belisarius hinted at. (Always compare the definite integral result against a numerical integration) – Simon Sep 20 '11 at 23:02
There can be various reasons for this type of behavior. Most likely is the definite integration code is checking for singularities on the integration path. But there are other possibilities. I'd need to see an example to comment in any detail. – Daniel Lichtblau Sep 20 '11 at 23:14
@Daniel I have posted two examples of a similar nature. – yayu Sep 21 '11 at 1:56

I think Daniel is right in his comment above: "Most likely is the definite integration code is checking for singularities on the integration path"

Just look:

``````Timing@Integrate[(r - c x)/(r^2 + c^2 - (2 r) c x)^(3/2), {x, -1, 1}]

Result -> None, I got bored waiting and aborted the calc
``````

While:

``` Timing@Integrate[(r - c x)/(r^2 + c^2 - (2 r) c x)^(3/2), {x, -1, 1},           Assumptions -> {r ∈ Reals && c ∈ Reals && c != r && c != -r}]```

``` ->{3.688, (-Sign[c - r] + Sign[c + r])/r^2} ```

So, it is a matter of which conditions you specify for your constants.

Another way is suggested in Simon's comment above:

``````Timing@Integrate[(r - c x)/(r^2 + c^2 - (2 r) c x)^(3/2), {x, -1, 1},
GenerateConditions -> False]

{10.375, ((-c + r)/Sqrt[(c - r)^2] + (c + r)/Sqrt[(c + r)^2])/r^2}
``````

And finally, you may also do:

``````Timing@Integrate[(r - c x)/(r^2 + c^2 - (2 r) c x)^(3/2), {x, -1, 1},
GenerateConditions -> True]

{16.45, ConditionalExpression[.. A long expression ...., Re[c^2 + r^2] > 0]}
``````
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Perhaps it should be said more explicitly that the statement of the OP "There are no singularities in this integral or running into complex numbers etc." is incorrect. For r==c the function has a singularity at x==1 and is complex beyond that. – Sjoerd C. de Vries Sep 21 '11 at 15:23
@Sjoerd There is a saying in Spanish about politeness and truth ... I am not able to translate it accurately. – Dr. belisarius Sep 21 '11 at 20:37
"La adulación se hace amigo y la verdad hace que los enemigos"? – Sjoerd C. de Vries Sep 21 '11 at 21:33
@Sjoerd "Lo cortés no quita lo valiente". Literally it says something like "Courtesy and valour are not mutually exclusive". But the figurative meaning is more like "you don't lose anything by being polite". Nevertheless, a good translation should be somewhere in the middle, allowing both "interpretations". That is where I am lost. – Dr. belisarius Sep 22 '11 at 0:59
More people are wrestling with this translation: forum.wordreference.com/showthread.php?t=1021831 – Sjoerd C. de Vries Sep 22 '11 at 8:25

Belisarius answered this. I just wanted to be a bit specific about what I meant in the comment, and how it applies to this example.

The denominator in the integrand makes it clear that we have a problem if, say, r and c are real, positive, and r

``````In[1]:= InputForm[Timing[Integrate[(r - c*x)/(r^2 + c^2 - 2*r*c*x)^(3/2),
{x, -1, 1}, Assumptions->r>c>0]]]
Out[1]//InputForm= {2.33, 2/r^2}
``````

Absent useful assumptions, Integrate can take significant time to sort out regions of good vs bad behavior. The technology under the hood is daunting (inequality handling can be that way). And perhaps it is not everywhere applied in the most efficient ways possible.

Further information may be found at

http://library.wolfram.com/infocenter/Conferences/5832/

or

http://dl.acm.org/citation.cfm?doid=2016567.2016569

Daniel Lichtblau

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