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I have an unsorted array and need to extract the longest sequence of sorted elements. For instance

A = 2,4,1,7,4,5,0,8,65,4,2,34

here 0,8,65 is my target sequence

I need to keep track of the index where this sequence starts

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how did you know that 0,8,65 is your target sequence ? –  Neel Basu Aug 19 '12 at 12:13
    
those elements are sorted and are 3 –  JackNova Aug 19 '12 at 12:27
    
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3 Answers

up vote 7 down vote accepted

You can do it in linear time O(N) with this algorithm: construct vector len of the same size N as the original vector, such that len[i] contains the length of the longest consecutive ascending run to which element seq[i] belongs.

The value of len[i] can be calculated as follows:

len[0] = 1;
for (int i = 1 ; i != N ; i++) {
    len[i] = seq[i-1] >= seq[i] ? 1 : len[i-1]+1;
}

With len in hand, find the index of max(len) element. This is the last element of your run. Track back to len[j] == 1 to find the initial element of the run.

seq    len
---    ---
  2      1
  4      2
  1      1
  7      2
  4      1
  5      2
  0      1
  8      2
 65      3 << MAX
  4      1
  2      1
 34      2

Note that at each step of the algorithm you need only the element len[i-1] to calculate len, so you can optimize for constant space by dropping vector representation of len and keeping the prior one, the max_len, and max_len_index.

Here is this algorithm optimized for constant space. Variable len represents len[i-1] from the linear-space algorithm.

int len = 1, pos = 0, maxlen = 1, current_start = 0;
for (int i = 1 ; i < seq.size() ; i++) {
    if (seq[i] > seq[i-1]) {
        len++;
        if (len > maxlen) {
            maxlen = len;
            pos = current_start;
        }
    } else {
        len = 1;
        current_start = i;
    }
}

Here is a link to this program on ideone.

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1  
This is not the simplest way ! Besides, it is unnatural,i.e. if you didn't see a similar solution previously, you're highly unlikely to come up with it; and it uses more memory than needed. –  Razvan Aug 19 '12 at 12:25
1  
@Razvan This is as trivial as dynamic programming algorithms go. I do agree about the "unlikely" part, but that's true of any non-trivial algorithm. –  dasblinkenlight Aug 19 '12 at 12:31
    
Woah! O(N) memory for this? Keep it simple and cheap instead. –  Nicholas Wilson Aug 19 '12 at 13:23
    
Your first attempt is wrong, len[i] always is 1. –  Saeed Amiri Aug 19 '12 at 16:23
    
@SaeedAmiri Thanks for noticing it, this is now fixed. –  dasblinkenlight Aug 19 '12 at 16:25
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You need 4 indexes (begin, end, tmp_begin, tmp_end). Iterate through the original array using tmp_begin, tmp_end as the work indexes and each time you find a longer sorted sequence update begin and end indices.

To check that a subsequence is sorted, you have to check that element at i is greater than element at i-- for each pair of consecutive items in the subsequence.

In the end: print all the elements in the original array starting at begin and ending at end.

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for(int i=0;i<size_of_array;i++)
{
  iterate++;
  after=array[iterate];
  if(after>before) {current_counter++;} else {current_counter=0;}
  if(max_counter<current_counter) max_counter=current_counter;
  before=array[iterate];
}

printf(" maximum length=%i ",max_counter);
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