# Deducing string transformation rules

I have a set of pairs of character strings, e.g.:

abba - aba, haha - aha, baa - ba, exb - esp, xa - za

The second (right) string in the pair is somewhat similar to the first (left) string.

That is, a character from the first string can be represented by nothing, itself or a character from a small set of characters.

There's no simple rule for this character-to-character mapping, although there are some patterns.

Given several thousands of such string pairs, how do I deduce the transformation rules such that if I apply them to the left strings, I get the right strings?

The solution can be approximate, working correctly for, say, 80-95% of the strings.

Would you recommend to use some kind of a genetic algorithm? If so, how?

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It is not at all clear what you are asking here. Statements like this "That is, a character from the first string can be represented by nothing, itself or a character from a small set of characters" are not making anything clear in this context. –  RBarryYoung Sep 28 '11 at 4:02
Your example makes it seem like it could be as simple as using the string pairs themselves as the mapping. –  Vaughn Cato Sep 28 '11 at 4:07
@RBarryYoung: With that I'm just trying to emphasize that there's no simple character to character mapping, that the same character on the left can be represented by a different one on the right depending on the surrounding characters or possibly the entire left string. The question is how to find the left-string to right-string transformation/rule given a set of pairs of these strings. –  Alexey Frunze Sep 28 '11 at 4:14
@VaughnCato: I don't want to store right strings as-is. I'm hoping to find a sufficiently compact "rule". As in, 0*0=0,1*1=1,2*2=4,3*3=9 and the rule is x*x=y, no need to store actual numbers. –  Alexey Frunze Sep 28 '11 at 4:17
Would you say that the objective is to find the smallest transformation grammar that reproduces the sample mapping 80% of the time? –  Vaughn Cato Sep 28 '11 at 4:23

If you could align the characters, or rather groups of characters, you could work out tables saying that aa => a, bb => z, and so on. If you had such tables, you could align the characters using http://en.wikipedia.org/wiki/Dynamic_time_warping. One approach is therefore to guess an alignment (e.g. one for one, just as a starting point, or just align the first and last characters of each sequence), work out a translation table from that, use DTW to get a new alignment, work out a revised translation table, and iterate in that way. Perhaps you could wrap this up with enough maths to show that there is some measure of optimality or probability that such passes increase, climbing to a local maximum.

There is probably some way of doing this by modelling a Hidden Markov Model that generates both sequences simultaneously and then deriving rules from that model, but I would not chose this approach unless I was already familiar with HMMs and had software to use as a starting point that I was happy to modify.

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Papers such as citeseerx.ist.psu.edu/viewdoc/… suggest that this is an area tricky enough to merit active research. –  mcdowella Sep 28 '11 at 17:30