As mentioned in the question ,need to find total number of (i,j) pairs in array such that

```
(1) **i<j**
(2) **a[i]>a[j]**
```

where i and j are indices of the array . There are no space constraints .

My question is

```
1) Is there any approach which takes less than O(N^2) time?
2) if so what is least complexity ?
3) How do we prove that ?
```

I hope i'm clear with the question .

My approach is as follows

One way of doing the question is using brute fore which takes O(N^2) time .

But I think that there should be a better optimised solution to this question at-least O(NlogN) sollution .The reason for my intuition is as follows

Intuition
`1) For sorting an array in ascending order conditions we have are : for i<j , a[i]<a[j] which is similar to my question . I also read that sorting has lower bound of Omega(n log n) . So my question should also have Omega(n log n) . I may be completely wrong if so please correct me .`

My second intuition is:

Suppose we have an array of elements as follows : 4,9,7,3,2,1,8,12

we calculate above condition `i<j , a[i]>a[j]`

for element 4 ,as i=0 points to 4 ,the possible values for j are 3,4,5 .since a[0]>a[3],a[0]>a[4],a[0]>a[5] ,so my total no of (i,j) pairs for now is 3 .
Next time when I increment i(index) to 1,the possibles values of j are 2,3,4,5,6 . But we should use the fact that when i=0 (when a[i]=4) we have computed 3 elements less than a[i=0] which is in turn less than a[i=1] , so i will not compare 9 with 3,2,1 (To remove unnecessary computations ).If we can remove unnecessary computations then we can reduce complexity to something less than O(N^2) or else no solution less than O(N^2) exists.But if solution exists then how do we do that.I tried making graph but my efforts are futile .

Approach 1)`In-order to obtain O(nlogn) complexity I think we need to tweak around quick sort or merge sort to get solution but problem here is, if we sort the array we loose the actual positions of elements.`

Approach `2)In-order to get solution in O(NlogN) time I think using tree we may get the optimised sollution . I didn't get any clue.`

Approach 3)`If there exists any O(N) time algorithm it should be with hashing . But in this case simple hashing doest work .`

So please let me know which of the above intuitions or approaches are correct (If correct which approach will lead to optimised sollution and how).

less than O(N^2)"? I ask because technically, O(N*2) is the same thing as O(N), and its not clear what you mean by "O(N2)".