Abstract
In the Shortest Superstring problem we are given a set of strings \(S=\{s_1, \ldots , s_n\}\) and an integer \(\ell \) and the question is to decide whether there is a superstring \(s\) of length at most \(\ell \) containing all strings of \(S\) as substrings. We obtain several parameterized algorithms and complexity results for this problem.
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