Abstract
We study the problem of perfectly reconstructing sequences from traces. The sequences are codewords from a deletion/insertion-correcting code and the traces are the result of corruption by a fixed number of symbol insertions (larger than the minimum edit distance of the code.) This is the general version of a problem tackled by Levenshtein for uncoded sequences. We introduce an exact formula for the maximum number of common supersequences shared by sequences at a certain edit distance, yielding a tight upper bound on the number of distinct traces necessary to guarantee exact reconstruction. We apply our results to the famous single deletion/insertion-correcting Varshamov-Tenengolts (VT) codes and show that a significant number of VT codeword pairs achieve the worst-case number of outputs needed for exact reconstruction.
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