# Maple - Integration returns undefined for very simple and possible integrations

This is a question about maple producing undefined errors.

The code below should give the result 0 but instead maple chooses to label it "undefined".

``````(nj*(nj-1))*(int(N^(ni+nj-2),N=-1..1));
ni:=0;  nj:=0;
``````

Since nj=0 you can see quite clearly that even before the integral, the answer is 0 x integral.

The integral is possible to do and doing it by hand it gives you (-1/N) evaluated between 1 and -1 so substituting in (-1/1)-(-1/-1) which is -1-1 = -2).

The overall answer is given by 0x-2 which is 0.

Maple returns undefined.

However if you take a subsection of that code (just the integral)

`````` (int(N^(ni+nj-2),N=-1..1)) or even (int(N^(-2),N=-1..1))
``````

then maple returns infinity.

Neither of these are correct.

Can anyone explain to me why this happens? I think others are likely to come across a similar issue because it is such a simple maple procedure. Yet it gives a confusing result.

-
For the second case, have a look at the plot of the function. The result is indeed inf. – nhahtdh Nov 24 '12 at 20:20
And you are forcing 0 * Inf, which doesn't make any sense, so the result is `Undefined` for the first case. – nhahtdh Nov 24 '12 at 20:23
Check out Integrability. The function is not bounded on the [-1, 1] interval. – nhahtdh Nov 24 '12 at 20:36
Thank you. Is there a way that I can somehow add limits into my code in order to make it work? It's part of a much larger program that I've written and I isolated this as the line that was causing a problem at ni=nj=0 (but for values of ni and nj above zero it holds - I use these higher values in a loop) so I was hoping to keep the code in somehow if there's a way to modify it. How would you recommend I change it? – Emily Finnerty Nov 24 '12 at 20:56
I assume ni and nj are natural number? Then if ni + nj - 2 is negative, and if ni + nj - 2 is odd then Cauchy principle value assumption holds, which allow the function to be integrable from negative to positive although the function may not be bounded; for the case ni + nj - 2 is even (and negative), then the function is not integrable from negative to positive number. If ni + nj - 2 >= 0, then it should be integrable (the case = 0 is a bit special since 0^0 is undefined, but from what I read, it should be OK). – nhahtdh Nov 25 '12 at 4:04

``````if nj = 0 then