# Find the number of unique longest common subsequences

For 2 strings, I want to find the number of distinct LCS's. I read on wiki on how to print all LCS's but how to check that they are distinct? The hash table is not feasible as my input string each can be 1500-2000 characters long so maximum number of LCS's can be 2000 choose 1000

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Since you’re only interested in the longest common subsequences, their number should be quite small. What’s wrong with the hash table approach? – Konrad Rudolph Nov 2 '09 at 11:38
Like I wrote, the number of LCS can be quite large, so it would be infeasible to store them in hash table.(if all are distinct) – Wifi Nov 2 '09 at 11:47
I have just got a paper. Can someone download this ? I am not able to do it.The title is: Computing the Number of Longest Common Subsequences by Ronald I greenberg – Wifi Nov 2 '09 at 11:55

Can you specify.

• Do substrings have to be consecutive, or any sub sequence would be ok? For example, in "abcde" would "abde" be a valid substring?
• What do you mean by distinct?
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No they dont need to be consecutive. It is the same standard LCS problem of dp. Its just that to find the number of distinct LCS if multiple LCS occur – Wifi Nov 2 '09 at 11:35
To answer your first question: no. This is not a substring by definition. Rather, it is a subsequence (again, by definition). – Konrad Rudolph Nov 2 '09 at 11:35
can you explain what do you mean by distinct? – husayt Nov 2 '09 at 11:37
It will also be a good idea to show what you want on example. As there are a number of similar problems, with tiny diffs. But these diffs they are enough to change the approach dramatically. – husayt Nov 2 '09 at 11:41

You can use a hash table, but instead of storing the whole substring, you just store (a list of) the beginning and end of it relative to the original string. This way, you can do a string compare in the original string if there are any collisions.

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Throw the two strings to a suffix tree. This is time and space linear in length of the concatenation of the two strings.

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This is the answer I was thinking of posting. This data structure is best for finding common subsequences when the most flexibility is needed. For example, if there are lots of duplicated long subsequences, this data structure will have acceptable performance. – Heath Hunnicutt Nov 5 '09 at 20:58
I'm not aware that a suffix tree can be used for longest common subsequences. They can however be used to find the longest common substring. – MAK Feb 6 '10 at 16:25

Good god I found a posting on this topic. Actually, I faced this problem in Amazon interview recently and I sent a code to them for review. They did not tell me whether its correct or wrong but I did not get any further inputs from them (so I assumed i have erred somewhere). I dont want the efficient implementation as you guys discuss. Can anyone just review the code I've written to check its correct or not.

http://www.technicalypto.com/2010/02/find-common-sequence-that-is-out-of.html

Many thanks

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