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An anagram is a type of word play, the result of rearranging the letters of a word or phrase to produce a new word or phrase, using all the original letters exactly once;

Subset Sum problem:

The problem is this: given a set of integers, is there a non-empty subset whose sum is zero?

For example, given the set { −7, −3, −2, 5, 8}, the answer is yes because the subset { −3, −2, 5} sums to zero. The problem is NP-complete.

Now say we have a dictionary of n words. Now Anagram Generation problem can be stated as to find a set of words in dictionary(of n words) which use up all letters of the input. So does'nt it becomes a kind of subset sum problem.

Am I wrong?

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would you please mark an accepted answer –  Raymond Hettinger Jan 6 '12 at 2:44

4 Answers 4

up vote 4 down vote accepted

If you'd prove that solving anagram finding (not more than polynomial number of times) solves subset sum problem - it would be a revolution in computer science (you'd prove P=NP).

Clearly finding anagrams is polynomial-time problem:

Checking if two dictionary records are anagrams of each other is as simple as sorting letters and compare resulting strings (that is C*n*log(n) time, where n - number of letters in a record). In the most trivial algorithm you'll have at most N*(N-1)/2 such checks, where N - number of records in a dictionary. In more advanced algorithm you'll have C*N*log(N) such checks. So obviously the running time is limited by a polynomial of input size (s = n*N).

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The two problems are similar but are not isomorphic.

  • In an anagram the order of the letters matters. In a subset sum, the order does not matter.
  • In an anagram, all the letters must be used. In a subset sum, any subset will do.
  • In an anagram, the subgroups must form words taken from a comparatively small dictionary of allowable words (the dictionary). In a subset sum, the groups are unrestricted (no dictionary of allowable groupings).
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Could the two not be isomorphic and still both be NP-complete given that NP-complete? Also, I didn't think you could biject an NP-complete approach (without proving P=NP), and therefore I have to wonder if you can even truly determine isomorphism. I guess merely demonstrating that one function is bijective if an NP-complete problem is assumed to never be bijective would effectively demonstrate the same? –  PlexQ Jan 3 '12 at 17:24

I think you are wrong.

Anagram Generation must be simpler than Subset Sum, because I can devise a trivial O(n) algorithm to solve it (as defined):

initialize the list of anagrams to an empty list
iterate the dictionary word by word
    if all the input letters are used in the ith word
        add the word to the list of anagrams

return the list of anagrams

Also, anagrams consist of valid words that are permutations of the input word (i.e. rearrangements) whereas subsets have no concept of order. They may actually include less elements than the input set (hence sub set) but an anagram must always be the same length as the input word.

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It isn't NP-Complete because given a single set of letters, the set of anagrams remains identical regardless.

There is always a single mapping that transforms the letters of the input L to a set of anagrams A. so we can say that f(L) = A for any execution of f. I believe, if I understand correctly, that this makes the function deterministic. The order of a Set is irrelevant, so considering a differently ordered solution non-deterministic is invalid, it is also invalid because all entries in a dictionary are unique, and thus can be deterministically ordered.

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