A Central Limit Theorem for the Length of the Longest Common Subsequences in Random Words

Abstract

Let (Xi)i ≥ 1 and (Yi)i≥1 be two independent sequences of independent identically distributed random variables taking their values in a common finite alphabet and having the same law. Let LCn be the length of the longest common subsequences of the two random words X1·s Xn and Y1·s Yn. Under a lower bound assumption on the order of its variance, LCn is shown to satisfy a central limit theorem. This is in contrast to the limiting distribution of the length of the longest common subsequences in two independent uniform random permutations of \1, …, n\, which is shown to be the Tracy-Widom distribution.