All those EPPA classes (strengthenings of the Herwig–Lascar theorem)

Hubička, Jan; Konečný, Matěj; Nešetřil, Jaroslav

doi:10.1090/tran/8654

Cited by 4 publications

(3 citation statements)

References 31 publications

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“…Remark 6.29. A similar, less restrictive notion of partial structure is used in constructions of Ramsey and EPPA classes [HN19,HKN22] to amalgamate structures in a complicated way which can not be done by iterating normal amalgamation. Partial structures are more important when working with non-free amalgamation classes.…”

Section: Envelopes and Embedding Typesmentioning

confidence: 99%

Big Ramsey Degrees of the Generic Partial Order

Balko

Chodounský

Dobrinen

et al. 2021

Trends in Mathematics

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As a result of 33 intercontinental Zoom calls, we characterise big Ramsey degrees of the generic partial order. This is an infinitary extension of the well known fact that finite partial orders endowed with linear extensions form a Ramsey class (this result was announced by Nešetřil and Rödl in 1984 with first published proof by Paoli, Trotter and Walker in 1985). Towards this, we refine earlier upper bounds obtained by Hubička based on a new connection of big Ramsey degrees to the Carlson-Simpson theorem and we also introduce a new technique of giving lower bounds using an iterated application of the upper-bound theorem.

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Section: Envelopes and Embedding Typesmentioning

confidence: 99%

Big Ramsey Degrees of the Generic Partial Order

Balko

Chodounský

Dobrinen

et al. 2021

Trends in Mathematics

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show abstract

“…Herwig proved the

\operatorname{{\it EP}}

for monotone, free amalgamation classes in [5], Solecki in [17] proved the analogous result for the class of finite metric spaces. [9] contains profound and comprehensive generalizations of the extension property, including coherent extensions, as well.…”

Section: Introductionmentioning

confidence: 99%

On dense, locally finite subgroups of the automorphism group of certain homogeneous structures

Sági

2024

Mathematical Logic Qtrly

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Let be a countable structure such that each finite partial isomorphism of it can be extended to an automorphism. Evans asked if the age (set of finite substructures) of satisfies Hrushovski's extension property, then is it true that the automorphism group of contains a dense, locally finite subgroup? In order to investigate this question, in the previous decades a coherent variant of Hrushovski's extension property has been introduced and studied. Among other results, we provide equivalent conditions for the existence of a dense, locally finite subgroup of in terms of a (new) variant of the coherent extension property. We also compare our notion with other coherent extension properties.

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“…Later on, the EPPA has been proven for a great number of classes of structures, most notably for classical finite relational structures (Herwig-Lascar [10]) and for finite metric spaces (Solecki [17]). For a survey of recent results on EPPA see [12]. Siniora-Solecki [16] defined the coherent EPPA and proved it for a large number of classes of classical structures.…”

mentioning

confidence: 99%

The Amalgamation Property and Urysohn Structures in Continuous Logic

GAO,

REN

2024

J. symb. log.

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In this paper we consider the classes of all continuous $\mathcal {L}$ -(pre-)structures for a continuous first-order signature $\mathcal {L}$ . We characterize the moduli of continuity for which the classes of finite, countable, or all continuous $\mathcal {L}$ -(pre-)structures have the amalgamation property. We also characterize when Urysohn continuous $\mathcal {L}$ -(pre)-structures exist, establish that certain classes of finite continuous $\mathcal {L}$ -structures are countable Fraïssé classes, prove the coherent EPPA for these classes of finite continuous $\mathcal {L}$ -structures, and show that actions by automorphisms on finite $\mathcal {L}$ -structures also form a Fraïssé class. As consequences, we have that the automorphism group of the Urysohn continuous $\mathcal {L}$ -structure is a universal Polish group and that Hall’s universal locally finite group is contained in the automorphism group of the Urysohn continuous $\mathcal {L}$ -structure as a dense subgroup.

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All those EPPA classes (strengthenings of the Herwig–Lascar theorem)

Cited by 4 publications

References 31 publications

Big Ramsey Degrees of the Generic Partial Order

Big Ramsey Degrees of the Generic Partial Order

On dense, locally finite subgroups of the automorphism group of certain homogeneous structures

The Amalgamation Property and Urysohn Structures in Continuous Logic

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