Invariant universality for quandles and fields

Abstract

We show that the embeddability relations for countable quandles and for countable fields of any given characteristic other than 2 are maximally complex in a strong sense: they are invariantly universal. This notion from the theory of Borel reducibility states that any analytic quasi-order on a standard Borel space essentially appears as the restriction of the embeddability relation to an isomorphism-invariant Borel set. As an intermediate step we show that the embeddability relation of countable quandles is a complete analytic quasi-order.

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Item Type:	Article
Authors/Creators:	Brooke-Taylor, AD https://orcid.org/0000-0003-3734-0933 Calderoni, F Miller, SK
Copyright, Publisher and Additional Information:	© Instytut Matematyczny PAN, 2020. This is an author produced version of an article published in Fundamenta Mathematicae. Uploaded in accordance with the publisher's self-archiving policy.
Keywords:	analytic quasi-orders, invariant universality, quandles, fields
Dates:	Published (online): 8 April 2020 Accepted: 2 February 2020
Institution:	The University of Leeds
Academic Units:	The University of Leeds > Faculty of Engineering & Physical Sciences (Leeds) > School of Mathematics (Leeds) > Pure Mathematics (Leeds)
Funding Information:	Funder Grant number EPSRC (Engineering and Physical Sciences Research Council) EP/K035703/2
Depositing User:	Symplectic Publications
Date Deposited:	18 Feb 2020 14:45
Last Modified:	17 Apr 2020 02:36
Status:	Published online
Publisher:	Polish Academy of Sciences, Institute of Mathematics
Identification Number:	10.4064/fm862-2-2020
Open Archives Initiative ID (OAI ID):	oai:eprints.whiterose.ac.uk:157247

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Invariant universality for quandles and fields

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