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Well-quasi-orderings (WQOs) are a fundamental tool in logic and computer science. They provide termination arguments in a large number of decidability (or finiteness, regularity, ...) results. In constraint solving, automated deduction, program analysis, and many more fields, wqos usually appear under the guise of specific tools, like Dickson's Lemma (for tuples of integers), Higman's Lemma (for words and their subwords), Kruskal's Tree Theorem and its variants (for finite trees with embeddings), and recently the Robertson-Seymour Theorem (for graphs and their minors). What is not very well known is how to analyze the complexity of wqo-based algorithms.
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论文共 6 篇作者统计合作学者相似作者
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CoRR (2023)
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Theory of Computing Systemsno. 4 (2014): 697-716
ICALP'03: Proceedings of the 30th international conference on Automata, languages and programming (2003): 790-801
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D-Core
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