Projective measure without projective Baire

Department of Mathematical Sciences

Research output: Book/Report › Book › Research › peer-review

Standard

Projective measure without projective Baire. / Friedman, Sy David; Schrittesser, David.

American Mathematical Society, 2020. 150 p. (Memoirs of the American Mathematical Society, Vol. 267).

Research output: Book/Report › Book › Research › peer-review

Harvard

Friedman, SD & Schrittesser, D 2020, Projective measure without projective Baire. Memoirs of the American Mathematical Society, vol. 267, American Mathematical Society.

APA

Friedman, S. D., & Schrittesser, D. (2020). Projective measure without projective Baire. American Mathematical Society. Memoirs of the American Mathematical Society Vol. 267

Vancouver

Friedman SD, Schrittesser D. Projective measure without projective Baire. American Mathematical Society, 2020. 150 p. (Memoirs of the American Mathematical Society, Vol. 267).

Author

Friedman, Sy David ; Schrittesser, David. / Projective measure without projective Baire. American Mathematical Society, 2020. 150 p. (Memoirs of the American Mathematical Society, Vol. 267).

Bibtex

@book{5f916f64995f4cf78f6406594a8c3644,

title = "Projective measure without projective Baire",

abstract = "We prove that it is consistent (relative to a Mahlo cardinal) that all projective sets of reals are Lebesgue measurable, but there is a ∆13 set without the Baire property. The complexity of the set which provides a counterexample to the Baire property is optimal.",

author = "Friedman, {Sy David} and David Schrittesser",

year = "2020",

language = "English",

isbn = "9781470442965",

series = "Memoirs of the American Mathematical Society",

publisher = "American Mathematical Society",

address = "United States",

}

RIS

TY - BOOK

T1 - Projective measure without projective Baire

AU - Friedman, Sy David

AU - Schrittesser, David

PY - 2020

Y1 - 2020

N2 - We prove that it is consistent (relative to a Mahlo cardinal) that all projective sets of reals are Lebesgue measurable, but there is a ∆13 set without the Baire property. The complexity of the set which provides a counterexample to the Baire property is optimal.

AB - We prove that it is consistent (relative to a Mahlo cardinal) that all projective sets of reals are Lebesgue measurable, but there is a ∆13 set without the Baire property. The complexity of the set which provides a counterexample to the Baire property is optimal.

M3 - Book

SN - 9781470442965

T3 - Memoirs of the American Mathematical Society

BT - Projective measure without projective Baire

PB - American Mathematical Society

ER -

ID: 188759426