Given a sequence (d1, d2, ..., dn), I want to evaluate the product (1 - Dij) for all i != j where Dij = 1 if di = dj and 0 otherwise.

The code I have only checks Dij when i

```
prod = 1;
for (int i=1; i<n; ++i) {
for (int j=i; j<=n; ++j) {
prod *= (1 - Dij);
}
}
```

I know I can stop when I get Dij=1, but what I'm trying to do is get a minimal expression of the Dij's to check. This way I have one expression and then I can use difference sequences and evaluate it. So I know that I can do `i<j`

instead of `i != j`

. So I want to expand out this product and get something like this for n=3:

```
(1 - D12) (1 - D13) (1 - D23) = 1 - D12 - D13 - D23 + D12*D13 + D12*D23 + D13*D23 - D12*D13*D23
```

But there is more that I can do. This expression is actually always equal to

```
1 - D12 - D13 - D23 + 3 * D12*D13 - D12*D13*D23
```

My questions are:

Why is D12 * D13 = D12 * D23? This is always true (meaning it doesn't matter what the d sequence is) but I don't really get why because it seems to me that this means D13 = D23 which isn't always true (it depends on the d sequence). This is the relation that helps make the expression smaller.

How can I find all the relations like this and get a minimal expression? Is the expression above minimal? I don't even know.

`1- D12 - D13 - D23 + 2 D12*D13`

is an answer for your point 2) – belisarius has settled Sep 26 '11 at 21:54