# How to find the Longest Common Subsequence in Exponential time?

I can do this the proper way using dynamic programming but I can't figure out how to do it in exponential time.

I'm looking to find the largest common sub-sequence between two strings. Note: I mean subsequences and not sub-strings the symbols that make up a sequence need not be consecutive.

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`A naive exponential algorithm is to notice that a string of length n has O(2n) different subsequences, so we can take the shorter string, and test each of its subsequences for presence in the other string, greedily.`: algorithmist.com/index.php/Longest_Common_Subsequence I hope this is helpful. – ChristopheD Jan 25 '12 at 21:23
why would you want exponential runtime when you have dynamic programming approach working? – Adrian Jan 25 '12 at 21:23
Its a potential exam question I have to be prepared for. – Deco Jan 25 '12 at 21:27

Just replace the lookups in the table in your dynamic programming code with recursive calls. In other words, just implement the recursive formulation of the LCS problem:

EDIT

In pseudocode (almost-python, actually):

``````def lcs(s1, s2):
if len(s1)==0 or len(s2)==0: return 0
if s1[0] == s2[0]: return 1 + lcs(s1[1:], s2[1:])
return max(lcs(s1, s2[1:]), lcs(s1[1:], s2))
``````
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What would this be in Pseudo code? I can't make out what that means. – Deco Jan 25 '12 at 21:32
@Deco added pseudocode :) note that it returns the length of LCS(s1, s2), you can easily patch it to keep track of the inedexes (ie. when s1[0] == s2[0] – Savino Sguera Jan 25 '12 at 22:18

Let's say you have two strings `a` and `b` of length `n`. The longest common subsequence is going to be the longest subsequence in string `a` that is also present in string `b`.

Thus we can iterate through all possible subsequences in `a` and see it is in `b`.

A high-level pseudocode for this would be:

``````for i=n to 0
for all length i subsequences s of a
if s is a subsequence of b
return s
``````
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@NiklasB. Could you give a counter-example to illustrate your claim? – tskuzzy Feb 27 '12 at 9:49
Damn, I think I made a mistake here. I'd remove my downvote, but it's locked :/ Sorry. – Niklas B. Feb 27 '12 at 14:13
No worries, as long as that's cleared up :) – tskuzzy Feb 27 '12 at 15:03

String A and String B. A recursive algorithm, maybe it's naive but it is simple:

Look at the first letter of A. This will either be in a common sequence or not. When considering the 'not' option, we trim off the first letter and call recursively. When considering the 'is in a common sequence' option we also trim it off and we also trim off from the start of B up to, and including, the same letter in B. Some pseudocode:

``````def common_subsequences(A,B, len_subsequence_so_far = 0):
if len(A) == 0 or len(B) == 0:
return
first_of_A = A[0] // the first letter in A.
A1 = A[1:] // A, but with the first letter removed
common_subsequences(A1,B,len_subsequence_so_far) // the first recursive call
if(the_first_letter_of_A_is_also_in_B):
Bn = ... delete from the start of B up to, and including,
... the first letter which equals first_of_A
common_subsequences(A1,Bn, 1+len_subsequence_so_far )
``````

You could start with that and then optimize by remembering the longest subsequence found so far, and then returning early when the current function cannot beat that (i.e. when `min(len(A), len(B))+len_subsequence_so_far` is smaller than the longest length found so far.

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Essentially if you don't use dynamic programming paradigm - you reach exponential time. This is because, by not storing your partial values - you are recomputing the partial values multiple times.

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The solution for this problem can be found here, (Code in Java) http://programmingpassionforjava.blogspot.com/2012/08/find-longest-common-sequence.html

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I guess we can use Dynamic Programming (DP) and compute Longest Common Subsequence. Complete explanation can be found at http://www.geeksforgeeks.org/dynamic-programming-set-4-longest-common-subsequence/

``````#include <iostream>
#include <cstring>

#define MAX1 1000
#define MAX2 1000

using namespace std;

int val[MAX1][MAX2];

int maximum(int x, int y) {
if(x>=y) {
return x;
} else {
return y;
}
}

int longestCommonSubsequence_recur(char str1[MAX1], int i, char str2[MAX2], int j) {

if(i<0 || j<0 ) {
return 0;
} else if(val[i][j] != -1) {
return val[i][j];
}

if(str1[i]==str2[j]) {
val[i][j] = 1 + longestCommonSubsequence_recur(str1, i-1, str2, j-1);
} else {
val[i][j] = maximum(longestCommonSubsequence_recur(str1, i, str2, j-1) , longestCommonSubsequence_recur(str1, i-1, str2, j));
}

return val[i][j];
}

int main() {

int length1, length2, num;
char str1[MAX1], str2[MAX2];

cout<<"String 1 : ";
cin>>str1;
length1 = strlen(str1);

cout<<"String 2 : ";
cin>>str2;
length2 = strlen(str2);

// Initialize the Value Array by "-1"
for(int i=0; i<length1; i++) {
for(int j=0; j<length2; j++) {
val[i][j] = -1;
}
}

num = longestCommonSubsequence_recur(str1, length1-1, str2, length2-1);

cout<<endl<<num;

return 0;
}
``````
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The question is about the naive method! – Wasim Thabraze Dec 21 '14 at 9:13