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Counting inversions in an array

This is a programming question that I had when I was interviewed by a company for a developer job few months ago.

Given an array A of N integers, an *inversion* of the array is defined as any pair of indexes (a,b) such that a<b and A[b]<A[a].

Write a function:

```
int inversion_count(int A[], int n);
```

which computes the number of inversions in A, or returns -1 if such number exceeds 1,000,000,000. For example, in the following array

```
A[0]=-1 A[1]=6 A[2]=3 A[3]=4 A[4]=7 A[5]=4
```

there are four inversions:

```
(1,2) (1,3) (1,5) (4,5)
```

so the function should return 4.

I solved this question in a very common way: using double loop.

```
int i, j;
long count;
for (i = 0; i < n; i++) {
for (j = i+1; j < n; j++) {
if (A[i] > A [j]) count++;
if (count > 1000000000) break; // exit loop
}
if (count > 1000000000) break; // exit loop
}
if (count > 1000000000) return -1;
else return count;
```

So the running time of it is : O (nsquare), and I was told that it was not efficient. I am now thinking of a different way to solve this problem, maybe using an **n log n** algorithm, but I haven't figured it out yet. Any ideas?

`Given is an array A of N integers, the inversion of the array is a pair of indexes (a,b) such that a`

, what is the definition of the inversion? – pstrjds Jul 18 '11 at 15:18