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The rational field is not universally definable in pseudo-exponentiation

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The rational field is not universally definable in pseudo-exponentiation. / Kirby, Jonathan.

In: Fundamenta Mathematicae, Vol. 232, 2016, p. 79-88.

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@article{da89081856d448a8aeaf74e1a254cb24,
title = "The rational field is not universally definable in pseudo-exponentiation",
abstract = "We show that the field of rational numbers is not definable by a universal formula in Zilber's pseudo-exponential field.",
author = "Jonathan Kirby",
year = "2016",
doi = "10.4064/fm232-1-6",
language = "English",
volume = "232",
pages = "79--88",
journal = "Fundamenta Mathematicae",
issn = "0016-2736",
publisher = "Instytut Matematyczny",

}

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TY - JOUR

T1 - The rational field is not universally definable in pseudo-exponentiation

AU - Kirby, Jonathan

PY - 2016

Y1 - 2016

N2 - We show that the field of rational numbers is not definable by a universal formula in Zilber's pseudo-exponential field.

AB - We show that the field of rational numbers is not definable by a universal formula in Zilber's pseudo-exponential field.

U2 - 10.4064/fm232-1-6

DO - 10.4064/fm232-1-6

M3 - Article

VL - 232

SP - 79

EP - 88

JO - Fundamenta Mathematicae

JF - Fundamenta Mathematicae

SN - 0016-2736

ER -

ID: 55311792