# Going through on a unsorted array, distance between elements

Given an unsorted array and the number of elements, for each element i have to print the number of elements between itself and the farest element in the array that is smaller than him, if there are not numbers -1

Example:

Input: 10 6 10 3 9 15 Output: 3 1 1 -1 -1 -1

I already did it, but my professor told it can be done much more EFFICIENT, of course im actually doing o(n^2). Divide and Conquer?, Binary Search?

My solution:

``````public void MedidaMolestia(int A[], int  N)
{
int i=0,  temp=0, k=N-1, j=0;

for(i=0; i<N; i++)
{
temp = A[i];

for(j=N-1;j>i ; j--)
{
if(A[j]<temp)
break;
}

if(i==j)
System.out.print(-1 + " ");

else
System.out.print((j-i)-1 + " ");
}
}
``````
-
Shouldn't the output be `3 1 2 -1 -1` ? –  Karan Ashar Oct 10 '12 at 2:20
Sorry, I couldn't understand your question completely and your code and your sample output seems to be doing different things if understand your question correctly. Please explain with clear examples –  SK. Oct 29 '12 at 18:09

Off the cuff, I can suggest some asymptotic improvement using a little dynamic programming:-

1. Use quicksort to get indices of each element in the sorted version of array. Takes O(n log n). for your example, it should be :-

``````sindex = [3 1 3 0 5 2] ( since sorted array is 3 6 9 10 10 15)
``````
2. You need to fill an array B such that B[i] stores the 1st occurence from the rightmost of an index that is less than i. do as follows:-

``````Initialize B to [N, N,...]
filledpos = N;
for j = N-1 to 0 inclusive
if(sindex[j] < filledpos) do
for i = sindex[j] to filledpos - 1 inclusive
// like if you find the 3rd smallest element fill B[4],.. B[filledpos]
B[i] = j
filledpos = sindex[j]
``````

For your example B = [2 2 3 3 5 5]. takes O(n) worst case

3. Now you know the position of the rightmost elem < i. do the foll(takes O(n))

``````for i = 0 to N-1
print i - B[sindex[i]]
``````
-