This is an algorithm optimization problem.

I have an integer array `A`

and want to build array `B`

such that `B[i]`

contains index `j`

of the element in `A[j]`

such that (`B[i] = j`

)

```
1. j > i
2. A[j] < A[i]
3. j is minimum of all possible j's.
```

For example if `A`

is:

```
A = [1,5,6,4,3,1,2]
```

Then `B`

will be (indexing from 0)

```
B = [-1,3,3,4,5,-1,-1]
```

`B[0] = -1`

because there is no numbers less than `1`

with indices more than `0`

.
`B[1] = 3`

because `A[3]`

is the right-closest element to index `1`

in `A`

that contains number less than `A[1]=5`

. And so forth.

I know the solution with `O(n*log(n))`

complexity using binary search tree. How can I enhance the complexity to `O(n)`

or prove that it is impossible?