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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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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Add this copy of Projective Measure Without Projective Baire to cart. $111.05, very good condition, Sold by Literary Cat Books rated 3.0 out of 5 stars, ships from Machynlleth, Powys, WALES, UNITED KINGDOM, published 2020 by American Mathematical Society.
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Very Good with no dust jacket. 1470442965. Slight creasing to spine. Slight wear to spine, cover & corners; Memoirs of the American Mathematical Society. September 2020. Volume 267. Number 1298; 25.3 x 17.8 x 1cms; v. 154 pages.
