On the Uniform Computational Content of Ramsey’s Theorem

Brattka, Vasco; Rakotoniaina, Tahina

doi:10.1017/jsl.2017.43

Cited by 37 publications

(72 citation statements)

References 35 publications

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“…We show below that the right-hand side is optimal. Our results extend a number of similar investigations, including by Dorais, Dzhafarov, Hirst, Mileti, and Shafer [13], Hirschfeldt and Jockusch [22], Patey [32], and Brattka and Rakotoniaina [10].…”

Section: Ramsey's Theorem For Singletonssupporting

confidence: 91%

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Ramsey’s theorem and products in the Weihrauch degrees

Dzhafarov

Goh

Hirschfeldt

et al. 2020

COM

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We study the positions in the Weihrauch lattice of parallel products of various combinatorial principles related to Ramsey's theorem. Among other results, we obtain an answer to a question of Brattka, by showing that Ramsey's theorem for pairs (RT 2 2 ) is Weihrauch-incomparable to the parallel product of the stable Ramsey's theorem for pairs and the cohesive principle (SRT 2 2 × COH). bridge University Press, Cambridge, second edition, 2009.

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Section: Ramsey's Theorem For Singletonssupporting

confidence: 91%

“…It is obvious that D 2 k . An independent proof can be found in [10,Corollary 6.12]. Note that if j < k then the version of each of the above principles for j-colorings is strongly Weihrauch reducible to the version for k-colorings.…”

Section: Introductionmentioning

confidence: 97%

Ramsey’s theorem and products in the Weihrauch degrees

Dzhafarov

Goh

Hirschfeldt

et al. 2020

COM

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“…Among them, reverse mathematics study their logical consequences [21]. More recently, various notions of effective reductions have been proposed to compare mathematical problems, namely, Weihrauch reductions [1,3], computable reductions [11], computable entailment [20], among others. A problem P is computably reducible to another problem Q (written P ≤ c Q) if every P-instance I computes a Q-instance J such that every solution to J computes relative to I a solution to I. P is Weihrauch reducible to Q (written P ≤ W Q) if moreover this computable reduction is witnessed by two fixed Turing functionals.…”

Section: Reductions Between Mathematical Problemsmentioning

confidence: 99%

Π10-Encodability and Omniscient Reductions

Monin¹,

Patey²

2019

Notre Dame J. Formal Logic

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A set of integers A is computably encodable if every infinite set of integers has an infinite subset computing A. By a result of Solovay, the computably encodable sets are exactly the hyperarithmetic ones. In this paper, we extend this notion of computable encodability to subsets of the Baire space and we characterize the Π 0 1 encodable compact sets as those who admit a non-empty Σ 1 1 subset. Thanks to this equivalence, we prove that weak weak König's lemma is not strongly computably reducible to Ramsey's theorem. This answers a question of Hirschfeldt and Jockusch. Π 0 1 ENCODABILITY AND OMNISCIENT REDUCTIONS 3 Π 0 1 ENCODABILITY AND OMNISCIENT REDUCTIONS 9

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“…(1) Either there is an infinite sequence F 0 < F 1 < · · · of ascending blobs contained in X, and the ascending Seetapun tree generated by this sequence is finite, or there is an infinite set Y ⊆ X that contains no ascending blob. (2) Either there is an infinite sequence F 0 < F 1 < · · · of descending blobs contained in X, and the descending Seetapun tree generated by this sequence is finite, or there is an infinite set Y ⊆ X that contains no descending blob.…”

Section: Proofs Of the Theoremsmentioning

confidence: 99%

The uniform content of partial and linear orders

Astor

Dzhafarov

Solomon

et al. 2017

Annals of Pure and Applied Logic

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The principle ADS asserts that every linear order on ω has an infinite ascending or descending sequence. This has been studied extensively in the reverse mathematics literature, beginning with the work of Hirschfeldt and Shore [16]. We introduce the principle ADC, which asserts that every such linear order has an infinite ascending or descending chain. The two are easily seen to be equivalent over the base system RCA 0 of second order arithmetic; they are even computably equivalent. However, we prove that ADC is strictly weaker than ADS under Weihrauch (uniform) reducibility. In fact, we show that even the principle SADS, which is the restriction of ADS to linear orders of type ω + ω * , is not Weihrauch reducible to ADC. In this connection, we define a more natural stable form of ADS that we call General-SADS, which is the restriction of ADS to linear orders of type k + ω, ω + ω * , or ω + k, where k is a finite number. We define General-SADC analogously. We prove that General-SADC is not Weihrauch reducible to SADS, and so in particular, each of SADS and SADC is strictly weaker under Weihrauch reducibility than its general version. Finally, we turn to the principle CAC, which asserts that every partial order on ω has an infinite chain or antichain. This has two previously studied stable variants, SCAC and WSCAC, which were introduced by Hirschfeldt and Jockusch [16], and by Jockusch, Kastermans, Lempp, Lerman, and Solomon [18], respectively, and which are known to be equivalent over RCA 0 . Here, we show that SCAC is strictly weaker than WSCAC under even computable reducibility.

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On the Uniform Computational Content of Ramsey’s Theorem

Cited by 37 publications

References 35 publications

Ramsey’s theorem and products in the Weihrauch degrees

Ramsey’s theorem and products in the Weihrauch degrees

Π10-Encodability and Omniscient Reductions

The uniform content of partial and linear orders

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