Constructing Wadge classes

Raphaël Carroy; Andrea Medini; Sandra Müller

Constructing Wadge classes

Raphaël Carroy
, Andrea Medini
, Sandra Müller

Department of Mathematics

Publications: Contribution to journal › Article

Abstract

We show that, assuming the Axiom of Determinacy, every non-selfdual Wadge class can be constructed by starting with those of level 𝜔1 (that is, the ones that are closed under Borel preimages) and iteratively applying the operations of expansion and separated differences. The proof is essentially due to Louveau, and it yields at the same time a new proof of a theorem of Van Wesep (namely, that every non-selfdual Wadge class can be expressed as the result of a Hausdorff operation applied to the open sets). The exposition is self-contained, except for facts from classical descriptive set theory.

Original language	English
Pages (from-to)	207-257
Journal	Bulletin of Symbolic Logic
Volume	28
Issue number	2
Publication status	Submitted - 9 May 2021

Austrian Fields of Science 2012

101013 Mathematical logic

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https://www.jstor.org/stable/27139154

Cite this

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title = "Constructing Wadge classes",

abstract = "We show that, assuming the Axiom of Determinacy, every non-selfdual Wadge class can be constructed by starting with those of level 휔1 (that is, the ones that are closed under Borel preimages) and iteratively applying the operations of expansion and separated differences. The proof is essentially due to Louveau, and it yields at the same time a new proof of a theorem of Van Wesep (namely, that every non-selfdual Wadge class can be expressed as the result of a Hausdorff operation applied to the open sets). The exposition is self-contained, except for facts from classical descriptive set theory.",

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AU - Carroy, Raphaël

AU - Medini, Andrea

AU - Müller, Sandra

PY - 2021/5/9

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N2 - We show that, assuming the Axiom of Determinacy, every non-selfdual Wadge class can be constructed by starting with those of level 휔1 (that is, the ones that are closed under Borel preimages) and iteratively applying the operations of expansion and separated differences. The proof is essentially due to Louveau, and it yields at the same time a new proof of a theorem of Van Wesep (namely, that every non-selfdual Wadge class can be expressed as the result of a Hausdorff operation applied to the open sets). The exposition is self-contained, except for facts from classical descriptive set theory.

AB - We show that, assuming the Axiom of Determinacy, every non-selfdual Wadge class can be constructed by starting with those of level 휔1 (that is, the ones that are closed under Borel preimages) and iteratively applying the operations of expansion and separated differences. The proof is essentially due to Louveau, and it yields at the same time a new proof of a theorem of Van Wesep (namely, that every non-selfdual Wadge class can be expressed as the result of a Hausdorff operation applied to the open sets). The exposition is self-contained, except for facts from classical descriptive set theory.

M3 - Article

SN - 1079-8986

VL - 28

SP - 207

EP - 257

JO - Bulletin of Symbolic Logic

JF - Bulletin of Symbolic Logic

IS - 2

ER -

Constructing Wadge classes

Abstract

Austrian Fields of Science 2012

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