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Projective Measure Without Projective Baire - 
      Sy David Friedman
    
      David Schrittesser

Projective Measure Without Projective Baire

; David Schrittesser

The authors prove that it is consistent (relative to a Mahlo cardinal) that all projective sets of reals are Lebesgue measurable, but there is a $\Delta^1_3$ set without the Baire property. The complexity of the set which provides a counterexample to the Baire property is optimal. Les mer
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Paperback
Legg i
Vår pris: 1190,-

(Paperback) Fri frakt!
Leveringstid: Sendes innen 21 dager

The authors prove that it is consistent (relative to a Mahlo cardinal) that all projective sets of reals are Lebesgue measurable, but there is a $\Delta^1_3$ set without the Baire property. The complexity of the set which provides a counterexample to the Baire property is optimal.
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Utgitt:
Forlag: American Mathematical Society
Innbinding: Paperback
Språk: Engelsk
Sider: 267
ISBN: 9781470442965
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Sy David Friedman, Kurt Godel Research Center, University of Vienna, Austria.

David Schrittesser, Kurt Godel Research Center, University of Vienna, Austria