2020
DOI: 10.1007/978-3-030-30229-0_2
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On Ordinal Invariants in Well Quasi Orders and Finite Antichain Orders

Abstract: We investigate the ordinal invariants height, length, and width of well quasi orders (WQO), with particular emphasis on width, an invariant of interest for the larger class of orders with finite antichain condition (FAC). We show that the width in the class of FAC orders is completely determined by the width in the class of WQOs, in the sense that if we know how to calculate the width of any WQO then we have a procedure to calculate the width of any given FAC order. We show how the width of WQO orders obtained… Show more

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Cited by 3 publications
(18 citation statements)
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“…These formulas can be seen as a reformulation of tree rank computation (see Section 2.3. of [DSS20] and the references therein). We can use them to recursively compute the invariants of A: this is called the method of residuals.…”
Section: Residual Characterizationmentioning
confidence: 95%
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“…These formulas can be seen as a reformulation of tree rank computation (see Section 2.3. of [DSS20] and the references therein). We can use them to recursively compute the invariants of A: this is called the method of residuals.…”
Section: Residual Characterizationmentioning
confidence: 95%
“…Section 2 introduces definitions, notations and recalls known results, mostly following [DSS20]. Section 3 proves intermediary results on lower bounds on the width that lay the ground for future proofs.…”
Section: Outline Of the Articlementioning
confidence: 99%
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