Grammar-based Compression of Unranked Trees

February 15, 2018 Β· Declared Dead Β· πŸ› Theory of Computing Systems

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Authors AdriΓ  GascΓ³n, Markus Lohrey, Sebastian Maneth, Carl Philipp Reh, Kurt Sieber arXiv ID 1802.05490 Category cs.DS: Data Structures & Algorithms Cross-listed cs.FL Citations 19 Venue Theory of Computing Systems Last Checked 3 months ago
Abstract
We introduce forest straight-line programs (FSLPs) as a compressed representation of unranked ordered node-labelled trees. FSLPs are based on the operations of forest algebra and generalize tree straight-line programs. We compare the succinctness of FSLPs with two other compression schemes for unranked trees: top dags and tree straight-line programs of first-child/next sibling encodings. Efficient translations between these formalisms are provided. Finally, we show that equality of unranked trees in the setting where certain symbols are associative or commutative can be tested in polynomial time. This generalizes previous results for testing isomorphism of compressed unordered ranked trees.
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