On Horowitz and Shelah's Borel maximal eventually different family

Publikation: Bidrag til bog/antologi/rapportBidrag til bog/antologiForskning

Standard

On Horowitz and Shelah's Borel maximal eventually different family. / Schrittesser, David.

Infinite Combinatorics and Forcing Theory. red. / Teruyuki Yorioka. Research Institute for Mathematical Sciences, RIMS, Kyoto University, 2017. s. 99-106 (RIMS Kôkyûroku ; Nr. 2042).

Publikation: Bidrag til bog/antologi/rapportBidrag til bog/antologiForskning

Harvard

Schrittesser, D 2017, On Horowitz and Shelah's Borel maximal eventually different family. i T Yorioka (red.), Infinite Combinatorics and Forcing Theory. Research Institute for Mathematical Sciences, RIMS, Kyoto University, RIMS Kôkyûroku , nr. 2042, s. 99-106. <http://www.kurims.kyoto-u.ac.jp/~kyodo/kokyuroku/contents/pdf/2042-08.pdf>

APA

Schrittesser, D. (2017). On Horowitz and Shelah's Borel maximal eventually different family. I T. Yorioka (red.), Infinite Combinatorics and Forcing Theory (s. 99-106). Research Institute for Mathematical Sciences, RIMS, Kyoto University. RIMS Kôkyûroku Nr. 2042 http://www.kurims.kyoto-u.ac.jp/~kyodo/kokyuroku/contents/pdf/2042-08.pdf

Vancouver

Schrittesser D. On Horowitz and Shelah's Borel maximal eventually different family. I Yorioka T, red., Infinite Combinatorics and Forcing Theory. Research Institute for Mathematical Sciences, RIMS, Kyoto University. 2017. s. 99-106. (RIMS Kôkyûroku ; Nr. 2042).

Author

Schrittesser, David. / On Horowitz and Shelah's Borel maximal eventually different family. Infinite Combinatorics and Forcing Theory. red. / Teruyuki Yorioka. Research Institute for Mathematical Sciences, RIMS, Kyoto University, 2017. s. 99-106 (RIMS Kôkyûroku ; Nr. 2042).

Bibtex

@inbook{5b0035bb03614a2ebc9e4d592dee4120,
title = "On Horowitz and Shelah's Borel maximal eventually different family",
abstract = "We give an exposition of Horowitz and Shelah{\textquoteright}s proof that there exists an effectively Borel maximal eventually different family (working in ZF or less) and announce two related theorems.",
author = "David Schrittesser",
year = "2017",
language = "English",
series = "RIMS K{\^o}ky{\^u}roku ",
number = "2042",
pages = "99--106",
editor = "Teruyuki Yorioka",
booktitle = "Infinite Combinatorics and Forcing Theory",
publisher = "Research Institute for Mathematical Sciences, RIMS, Kyoto University",

}

RIS

TY - CHAP

T1 - On Horowitz and Shelah's Borel maximal eventually different family

AU - Schrittesser, David

PY - 2017

Y1 - 2017

N2 - We give an exposition of Horowitz and Shelah’s proof that there exists an effectively Borel maximal eventually different family (working in ZF or less) and announce two related theorems.

AB - We give an exposition of Horowitz and Shelah’s proof that there exists an effectively Borel maximal eventually different family (working in ZF or less) and announce two related theorems.

UR - http://www.kurims.kyoto-u.ac.jp/~kyodo/kokyuroku/kokyuroku.html

M3 - Book chapter

T3 - RIMS Kôkyûroku

SP - 99

EP - 106

BT - Infinite Combinatorics and Forcing Theory

A2 - Yorioka, Teruyuki

PB - Research Institute for Mathematical Sciences, RIMS, Kyoto University

ER -

ID: 189671175