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Given an array arr[] of integers, find out the difference between any two elements such that larger element appears after the smaller number in arr[].

Max Difference = Max { arr[x] - arr[y] | x > y }

Examples:

  • If array is [2, 3, 10, 6, 4, 8, 1, 7] then returned value should be 8 (Diff between 10 and 2).

  • If array is [ 7, 9, 5, 6, 3, 2 ] then returned value should be 2 (Diff between 7 and 9)

My Algorithm:

I thought of using D&C algorithm. Explanation

2, 3, 10, 6, 4, 8, 1, 7

then

2,3,10,6      and     4,8,1,7

then

2,3  and 10,6  and  4,8 and 1,7

then

2 and 3   10 and 6   4 and 8    1 and 7

Here as these elements will remain in same order, i will get the maximum difference, here it's 6.

Now i will move back to merege these arrays and again find the difference between minimum of first block and maximum of second block and keep doing this till end.

I am not able to implement this in my code. can anyone please provide a pseudo code for this?

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Would you please make your question more clear. It seems as if you are trying to implement merge-sort firstly and then achieve something else. –  shekhar suman Jun 5 '14 at 9:04
    
@shekharsuman I want maximum of (arr[x]-arr[y]) such that index x > y. –  instance Jun 5 '14 at 9:46

2 Answers 2

We have max { A[i] - A[j] | i > j } = max { A[i] - min { A[j] | j < i } | i }, which yields a straightforward O(n) algorithm:

prefix_min = A[0]
result = -infinity
for i := 1 to n - 1:
    # invariant: We have prefix_min = min { A[j] | j < i }
    result = max(result, A[i] - prefix_min)
    prefix_min = min(prefix_min, A[i])

Divide & Conquer is conceptionally more complicated, but also leads to a linear time solution (with a higher constant factor).

share|improve this answer
    
Very elegant solution. –  user1990169 Jun 5 '14 at 10:47

Say you want to find the largest Difference LD(A[])

Complete Psuedocode as desired:

Divide the array in two parts A1[] and A2[].

Find minimum & maximum element in A1[] and LD(A1).
Find minimum & maximum element in A2[] and LD(A2).

LD(A) = max( LD(A1), LD(A2), MAX(A2) - MIN(A1) )
MAX(A) = max( MAX(A1), MAX(A2) )
MIN(A) = min( MIN(A1), MIN(A2) )

Base Case (length(A) == 2):

If A[1] > A[0], 
  LD(A) = A[1] - A[0].
  MAX(A) = A[1]
  MIN(A) = A[0]
else
  LD(A) = 0.
  MAX(A) = A[0]
  MIN(A) = A[1]

Note:

If (length(A) == 1)
    LD(A) = 0
    MIN(A) = MAX(A) = A[0]

Similarly you can calculate the min and max elements in each subarray.

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-Do you think that he asked the same question?Actually,this was the algorithm which he wanted to implement! Your answer doesn't serve the output of his question! Please go through his example once again. –  shekhar suman Jun 5 '14 at 9:14
    
@shekharsuman He wanted the psuedo-code for his algorithm. I have provided him that. –  user1990169 Jun 5 '14 at 9:24

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