Optimal trade-offs for pattern matching with $k$ mismatches

April 05, 2017 Β· Declared Dead Β· πŸ› arXiv.org

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Authors PaweΕ‚ Gawrychowski, PrzemysΕ‚aw UznaΕ„ski arXiv ID 1704.01311 Category cs.DS: Data Structures & Algorithms Citations 5 Venue arXiv.org Last Checked 4 months ago
Abstract
Given a pattern of length $m$ and a text of length $n$, the goal in $k$-mismatch pattern matching is to compute, for every $m$-substring of the text, the exact Hamming distance to the pattern or report that it exceeds $k$. This can be solved in either $\widetilde{O}(n \sqrt{k})$ time as shown by Amir et al. [J. Algorithms 2004] or $\widetilde{O}((m + k^2) \cdot n/m)$ time due to a result of Clifford et al. [SODA 2016]. We provide a smooth time trade-off between these two bounds by designing an algorithm working in time $\widetilde{O}( (m + k \sqrt{m}) \cdot n/m)$. We complement this with a matching conditional lower bound, showing that a significantly faster combinatorial algorithm is not possible, unless the combinatorial matrix multiplication conjecture fails.
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