Computing NP-hard Repetitiveness Measures via MAX-SAT

July 06, 2022 Β· Declared Dead Β· πŸ› Embedded Systems and Applications

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Authors Hideo Bannai, Keisuke Goto, Masakazu Ishihata, Shunsuke Kanda, Dominik KΓΆppl, Takaaki Nishimoto arXiv ID 2207.02571 Category cs.DS: Data Structures & Algorithms Citations 6 Venue Embedded Systems and Applications Last Checked 4 months ago
Abstract
Repetitiveness measures reveal profound characteristics of datasets, and give rise to compressed data structures and algorithms working in compressed space. Alas, the computation of some of these measures is NP-hard, and straight-forward computation is infeasible for datasets of even small sizes. Three such measures are the smallest size of a string attractor, the smallest size of a bidirectional macro scheme, and the smallest size of a straight-line program. While a vast variety of implementations for heuristically computing approximations exist, exact computation of these measures has received little to no attention. In this paper, we present MAX-SAT formulations that provide the first non-trivial implementations for exact computation of smallest string attractors, smallest bidirectional macro schemes, and smallest straight-line programs. Computational experiments show that our implementations work for texts of length up to a few hundred for straight-line programs and bidirectional macro schemes, and texts even over a million for string attractors.
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