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THE GAME OPERATOR ACTING ON WADGE CLASSES OF BOREL SETS

Published online by Cambridge University Press:  13 June 2019

GABRIEL DEBS
Affiliation:
SORBONNE UNIVERSITÉ UNIVERSITÉ PARIS DIDEROT, CNRS INSTITUT DE MATHÉMATIQUES DE JUSSIEU-PARIS RIVE GAUCHE IMJ-PRG, F-75005 PARIS, FRANCE and UNIVERSITÉ LE HAVRE NORMANDIE INSTITUT UNIVERSITAIRE DE TECHNOLOGIE RUE BORIS VIAN, BP 4006 76610 LE HAVRE, FRANCEE-mail: [email protected]
JEAN SAINT RAYMOND
Affiliation:
SORBONNE UNIVERSITÉ UNIVERSITÉ PARIS DIDEROT, CNRS INSTITUT DE MATHÉMATIQUES DE JUSSIEU-PARIS RIVE GAUCHE IMJ-PRG, F-75005 PARIS, FRANCE E-mail: [email protected]

Abstract

We study the behavior of the game operator $$ on Wadge classes of Borel sets. In particular we prove that the classical Moschovakis results still hold in this setting. We also characterize Wadge classes ${\bf{\Gamma }}$ for which the class has the substitution property. An effective variation of these results shows that for all $1 \le \eta < \omega _1^{{\rm{CK}}}$ and $2 \le \xi < \omega _1^{{\rm{CK}}}$, is a Spector class while is not.

Type
Articles
Copyright
Copyright © The Association for Symbolic Logic 2019 

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References

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