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I'm having problems trying to find the elements that form the Longest Increasing Subsequence of a given list.

I have the algorithm to find the value of a given item of the list, and I understand the method it uses, I just don't know what to add and where to add it so that I have the numbers that compose the L.I.S.

Here is what I'm doing now:

for (A[0] = N[0], i=lis=1; i<n; i++) {
    int *l = lower_bound(A, A+lis, N[i]);
    lis = max(lis, (l-A)+1);
    *l = N[i];
}

A is an array that stores the partial L.I.S., but at some point it changes because there may be a different solution. N is the array of elements.

How can I get from here to finding the longest increasing subsequence of N?

share|improve this question
    
What does (l-A) do here? –  Ari Sep 10 '12 at 8:07
    
(l-A) is the index of the element. l is a pointer to that element, but if I subtract the A (pointer to the first element of the array) I get the integer index. (Arithmetic of pointers) –  Andrés Sep 10 '12 at 14:41

1 Answer 1

up vote 2 down vote accepted

You can use two additional array to find the LIS. For example, if your source is put in an array A

1  8  4  12  6  6  1

and we have an array B to store the elements of A which are more likely to be elements of LIS. More precisely, B will be maintained as an LIS at position i. Plus an array idx to record the positions.

We begin from A[0], place A[0] at B[0]. Since A[0] is appended at position 0 in B, idx[0] = 0.

      [0]  1   2   3   4   5   6

 A  |  1   8   4  12   6   6   1
 B  | (1)
idx |  0

Then for position 1, since element in B is smaller than A[1], A[1] is appended to B. idx[1] records the position in B which is 1.

       0  [1]  2   3   4   5   6

 A  |  1   8   4  12   6   6   1
 B  |  1  (8)
idx |  0   1

For position 2, A[2], or 4, is more likely to be an element of LIS compared to elements in B in order to maintain B as an LIS. So find the element in B which is the smallest one no less than 4 and replace, which is 8. idx[2] is set to the position where 8 is replaced in B. I think you can use your searching algorithm to find such an element.

       0   1  [2]  3   4   5   6

 A  |  1   8   4  12   6   6   1
 B  |  1  (4)
idx |  0   1   1

So continue this manner, we gradually set up idx.

position 3
       0   1   2  [3]  4   5   6

 A  |  1   8   4  12   6   6   1
 B  |  1   4 (12)
idx |  0   1   1   2

position 4
       0   1   2   3  [4]  5   6

 A  |  1   8   4  12   6   6   1
 B  |  1   4  (6)
idx |  0   1   1   2   2

position 5
       0   1   2   3   4  [5]  6

 A  |  1   8   4  12   6   6   1
 B  |  1   4  (6)
idx |  0   1   1   2   2   2

position 6
       0   1   2   3   4   5  [6]

 A  |  1   8   4  12   6   6   1
 B  | (1)  4   6
idx |  0   1   1   2   2   2   0

We have idx recorded positions, now we scan idx backwards and will find out the LIS.

       0   1   2   3   4   5   6

 A  |  1   8   4  12   6   6   1
idx |  0   1   1   2   2  (2)  0    | 6

       0   1   2   3   4   5   6

 A  |  1   8   4  12   6   6   1
idx |  0   1  (1)  2   2   2   0    | 4  6

       0   1   2   3   4   5   6

 A  |  1   8   4  12   6   6   1
idx | (0)  1   1   2   2   2   0    | 1  4  6

Hence, the output LIS is {1, 4, 6}

The code and A = {1, 8, 4, 12, 6, 6, 1} as source

#include <stdio.h>
#include <stdlib.h>

#define INT_INF 10000

int search_replace(int *lis, int left, int right, int key) {
        int mid;

        for (mid = (left+right)/2; left <= right; mid = (left+right)/2) {
                if (lis[mid] > key) {
                        right = mid - 1;
                } else if (lis[mid] == key) {
                        return mid;
                } else if (mid+1 <= right && lis[mid+1] >= key) {
                        lis[mid+1] = key;
                        return mid+1;
                } else {
                        left = mid + 1;
                }
        }
        if (mid == left) {
                lis[mid] = key;
                return mid;
        }
        lis[mid+1] = key;
        return mid+1;
}

int main(void) {
        int i, tmp, size = 7, lis_length = -1; 
        int *answer;
        int A[7] = {1,8,4,12,6,6,1},
            LIS[7],
            index[7] = {0};

        LIS[0] = A[0];
        for (i = 1; i < size; ++i) {
                LIS[i] = INT_INF;
        }

        for (i = 1; i < size; ++i) {
                index[i] = search_replace(LIS, 0, i, A[i]);
                if (lis_length < index[i]) {
                        lis_length = index[i];
                }
        }

        answer = (int*) malloc((lis_length+1) * sizeof(int));
        for (i = size-1, tmp = lis_length; i >= 0; --i) {
                if (index[i] == tmp) {
                        answer[tmp] = A[i];
                        --tmp;
                }
        }

        printf("LIS: ");
        for (i = 0; i < lis_length+1; ++i) {
                printf("%d ", answer[i]);
        }
        printf("\n");

        return 0;
}

And the output of the code

LIS: 1 4 6
share|improve this answer
    
Thank you. I'll take this approach when I needed it again. –  Andrés Nov 7 '12 at 2:08

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