TARGETbe a set of strings that I expect to be spoken.
SOURCEbe the set of strings returned by a speech recognizer (that is, the possible sentences that it has heard).
I need a way to choose a string from
TARGET. I read about the Levenshtein distance and the Damerau-Levenshtein distance, which basically returns the distance between a source string and a target string, that is the number of changes needed to transform the source string into the target string.
But, how can I apply this algorithm to a set of target strings?
I thought I'd use the following method:
- For each string that belongs to
TARGET, I calculate the distance from each string in
SOURCE. In this way we obtain an m-by-n matrix, where n is the cardinality of
SOURCEand n is the cardinality of
TARGET. We could say that the i-th row represents the similarity of the sentences detected by the speech recognizer with respect to the i-th target.
- Calculating the average of the values on each row, you can obtain the average distance between the i-th target and the output of the speech recognizer. Let's call it
iis the row index.
- Finally, for each row, I calculate the standard deviation of all values in the row. For each row, I also perform the sum of all the standard deviations. The result is a column vector, in which each element (Let's call it
stadard_deviation_sum(i)) refers to a string of
The string which is associated with the shortest
stadard_deviation_sum could be the sentence pronounced by the user. Could be considered the correct method I used? Or are there other methods?
Obviously, too high values indicate that the sentence pronounced by the user probably does not belong to