A co-analytic maximal set of orthogonal measures

Publikation: Bidrag til tidsskriftTidsskriftartikelForskningfagfællebedømt

Standard

A co-analytic maximal set of orthogonal measures. / Fischer, Vera; Törnquist, Asger Dag.

I: Journal of Symbolic Logic, Bind 75, Nr. 4, 2010, s. 1403-1414.

Publikation: Bidrag til tidsskriftTidsskriftartikelForskningfagfællebedømt

Harvard

Fischer, V & Törnquist, AD 2010, 'A co-analytic maximal set of orthogonal measures', Journal of Symbolic Logic, bind 75, nr. 4, s. 1403-1414. https://doi.org/10.2178/jsl/1286198154

APA

Fischer, V., & Törnquist, A. D. (2010). A co-analytic maximal set of orthogonal measures. Journal of Symbolic Logic, 75(4), 1403-1414. https://doi.org/10.2178/jsl/1286198154

Vancouver

Fischer V, Törnquist AD. A co-analytic maximal set of orthogonal measures. Journal of Symbolic Logic. 2010;75(4):1403-1414. https://doi.org/10.2178/jsl/1286198154

Author

Fischer, Vera ; Törnquist, Asger Dag. / A co-analytic maximal set of orthogonal measures. I: Journal of Symbolic Logic. 2010 ; Bind 75, Nr. 4. s. 1403-1414.

Bibtex

@article{8f6d757867434ddfaa6a938d5de3dbf2,
title = "A co-analytic maximal set of orthogonal measures",
abstract = "We prove that if V = L then there is a Π! maximal orthogonal (i.e., mutually singular) set of measures on Cantor space. This provides a natural counterpoint to the well-known theorem of Preiss and Rataj [16] that no analytic set of measures can be maximal orthogonal.",
author = "Vera Fischer and T{\"o}rnquist, {Asger Dag}",
year = "2010",
doi = "10.2178/jsl/1286198154",
language = "English",
volume = "75",
pages = "1403--1414",
journal = "Journal of Symbolic Logic",
issn = "0022-4812",
publisher = "Cambridge University Press",
number = "4",

}

RIS

TY - JOUR

T1 - A co-analytic maximal set of orthogonal measures

AU - Fischer, Vera

AU - Törnquist, Asger Dag

PY - 2010

Y1 - 2010

N2 - We prove that if V = L then there is a Π! maximal orthogonal (i.e., mutually singular) set of measures on Cantor space. This provides a natural counterpoint to the well-known theorem of Preiss and Rataj [16] that no analytic set of measures can be maximal orthogonal.

AB - We prove that if V = L then there is a Π! maximal orthogonal (i.e., mutually singular) set of measures on Cantor space. This provides a natural counterpoint to the well-known theorem of Preiss and Rataj [16] that no analytic set of measures can be maximal orthogonal.

U2 - 10.2178/jsl/1286198154

DO - 10.2178/jsl/1286198154

M3 - Journal article

AN - SCOPUS:78951482453

VL - 75

SP - 1403

EP - 1414

JO - Journal of Symbolic Logic

JF - Journal of Symbolic Logic

SN - 0022-4812

IS - 4

ER -

ID: 61336253