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I had previously posted a question, given an array, find out the next minimum element for each element now, i was trying to know , if there is any way to find out "given an array, for each element, find out the total number of elements lesser than it, which appear to the right of it" for example, the array [4 2 1 5 3] should yield [3 1 0 1 0]??

[EDIT] I have worked out a solution, please have a look at it, and let me know if there is any mistake.

1 Make a balanced BST inserting elements traversing the array from right to left

2 The BST is made in such a way that each element holds the size of the tree rooted at that element

3 Now while you search for the right position to insert any element, take account of the total size of the subtree rooted at left sibling + 1(for parent) if you move right Now since, the count is being calculated at the time of insertion of an element, and that we are moving from right to left, we get the exact count of elements lesser than the given element appearing after it.

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6 Answers 6

up vote 9 down vote accepted

It can be solved in O(n log n).

If in a BST you store the number of elements of the subtree rooted at that node when you search the node (reaching that from the root) you can count number of elements larger/smaller than that in the path:

int count_larger(node *T, int key, int current_larger){
    if (*T == nil)
        return -1;
    if (T->key == key)
        return current_larger + (T->right_child->size);
    if (T->key > key)
        return count_larger(T->left_child, key, current_larger + (T->right_child->size) + 1);
    return count_larger(T->right_child, key, current_larger)

** for example if this is our tree and we're searching for key 3, count_larger will be called for:

-> (node 2, 3, 0)
--> (node 4, 3, 0)
---> (node 3, 3, 2)

and the final answer would be 2 as expected.

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No, this won't work you are first constructing the tree, now suppose the control goes to if (T->key > key) return count_larger(T->left_child, key, current_larger + (T->right_child->size) + 1); while searching for any element.. the problem is that (T->right_child->size) + 1); will include elements that have been inserted prior to the element being searched.. –  Raman Bhatia Feb 29 '12 at 11:04
@RamanBhatia It would work. For each element starting from the right, (1) increment the count for that element and update the tree, and (2) look up the cumulative count. When you do a lookup, the tree contains only the items to the right of the current element and the element itself. –  tom Feb 29 '12 at 11:52
yeah.. that's what i have posted (have edited the question, and posted my solution there) and i mistook your " when you search the node (reaching that from the root)" as doing a search after constructing the entire tree, for each element.. My bad.. –  Raman Bhatia Feb 29 '12 at 12:26
@RamanBhatia :+1 to question . what does the size mean in "(T->right_child->size)" is it a special field in node or something else.. what does he mean when a-z says " you store the number of elements of the subtree rooted at that node when you search the node (reaching that from the root) " . pls explain with a small input data . thanks in advance –  Imposter Oct 24 '12 at 12:02
@a-z :pls explain with example .. –  Imposter Oct 24 '12 at 12:03

I think is it possible to do it in O(nlog(n))with a modified version of quicksort. Basically each time you add an element to less, you check if this element rank in the original array was superior to the rank of the current pivot. It may look like

oldrank -> original positions 
count -> what you want
function quicksort('array')
  if length('array') ≤ 1
      return 'array'  // an array of zero or one elements is already sorted
  select and remove a pivot value 'pivot' from 'array'
  create empty lists 'less' and 'greater'
  for each 'x' in 'array'
      if 'x' ≤ 'pivot' 
         append 'x' to 'less'
         if oldrank(x) > = oldrank(pivot)  increment count(pivot)
         append 'x' to 'greater'
         if oldrank(x) <  oldrank(pivot)  increment count(x) //This was missing
  return concatenate(quicksort('less'), 'pivot', quicksort('greater')) // two recursive calls


Actually it can be done using any comparison based sorting algorithm . Every time you compare two elements such that the relative ordering between the two will change, you increment the counter of the bigger element.

Original pseudo-code in wikipedia.

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No, it won't work. The pivot in the second recursive call needs to be aware of the 'other half', but it isn't. Nice idea though. –  tom Feb 29 '12 at 10:19
you are right tom. corrected –  UmNyobe Feb 29 '12 at 10:23
I am afraid it still doesn't work. The elements in greater need to be aware of all the elements in less, not just the pivot. –  tom Feb 29 '12 at 11:31
//some array called newarray
for(int x=0; x <=array.length;x++)
for(int y=x;y<array.length;y++)
if(array[y] < array[x])
newarray[x] = newarray[x]+1;

something like this,where array is your input array and newarray your output array make sure to initialize everything correctly(0 for the newarrays values)

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This is the naive O(n^2) approach.. I was wondering if there is any O(nlogn) approach for the same –  Raman Bhatia Feb 29 '12 at 9:06
it's not O(n^2) but O(n*(n-1)),not? –  Volker Mauel Feb 29 '12 at 9:11
if that was a joke, then it was not at all funny!!! –  Raman Bhatia Feb 29 '12 at 9:17
const values doesn't change asymptotic growth rate! –  mLevan Feb 29 '12 at 9:20
if the inner loop would go from 0 to arraylength it would be n^2,but it doesn't,so it's less.... –  Volker Mauel Feb 29 '12 at 9:34

You can also use binary Index tree

int tree[1000005];
void update(int idx,int val)
       idx+=(idx & -idx);

int sum(int idx)
    int sm=0;
       idx-=(idx & -idx);
    return sm;

int main()
    int a[]={4,2,1,5,3};
    int s=0,sz=6;
    int b[10];
    for(int i=sz-2;i>=0;i--)
        else s++;
    for(int i=0;i<sz-1;i++)
       cout<<b[i]<<" ";
   return 0;
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You can also use an array instead of a binary search tree.

def count_next_smaller_elements(xs):
    # prepare list "ys" containing item's numeric order
    ys = sorted((x,i) for i,x in enumerate(xs))
    zs = [0] * len(ys)

    for i in range(1, len(ys)):
        zs[ys[i][1]] = zs[ys[i-1][1]]
        if ys[i][0] != ys[i-1][0]: zs[ys[i][1]] += 1

    # use list "ts" as binary search tree, every element keeps count of
    # number of children with value less than the current element's value
    ts = [0] * (zs[ys[-1][1]]+1)
    us = [0] * len(xs)

    for i in range(len(xs)-1,-1,-1):
        x = zs[i]+1
        while True:
            us[i] += ts[x-1]
            x -= (x & (-x))
            if x <= 0: break

        x = zs[i]+1
        while True:
            x += (x & (-x))
            if x > len(ts): break
            ts[x-1] += 1

    return us

print count_next_smaller_elements([40, 20, 10, 50, 20, 40, 30])
# outputs: [4, 1, 0, 2, 0, 1, 0]
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Suppose the Array is 6,-1,5,10,12,4,1,3,7,50


1.We start building a BST from right end of the array.Since we are concerned with all the elements to right for any element.

2.Suppose we have formed the partial solution tree upto the 10.

enter image description here

3.Now when inserting 5 we do a tree traversal and insert to the right of 4. Notice that each time we traverse to the right of any node we increment by 1 and add the no. of elements in left subtree of that node. eg:
for 50 it is 0
for 7 it is 0
for 12 it is 1 right traversel + leftsubtree size of 7 = 1+3 =4
for 10 same as above.
for 4 it is 1+1 =2

While building bst we can easily maintain the left subtree size for each node by simply maintaining a variable corresponding to it and incrementing it by 1 each time a node traverses to the left by it.
Hence the Solution Average case O(nlogn).

We can use other optimizations such as predetermining whether array is sorted in decreasing order find groups of element in decreasing order treat them as single.

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