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3 - Rational numbers

Published online by Cambridge University Press:  07 May 2010

H. Salzmann
Affiliation:
Eberhard-Karls-Universität Tübingen, Germany
T. Grundhöfer
Affiliation:
Bayerische-Julius-Maximilians-Universität Würzburg, Germany
H. Hähl
Affiliation:
Universität Stuttgart
R. Löwen
Affiliation:
Technische Universität Carolo Wilhelmina zu Braunschweig, Germany
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Summary

This chapter treats the different kinds of structures on the field ℚ of rational numbers (algebra, order and topology) and various combinations of them in the same way as it was done in Chapter 1 for the field ℝ of real numbers.

We sometimes profit from the fact that ℚ is embedded in ℝ so that we can use results from Chapter 1. In doing so, we take the field ℝ for granted. Constructions of ℝ from ℚ are presented in Chapter 2 (via an ultrapower of ℚ) and in Chapter 4 (by completion of ℚ).

The additive group of the rational numbers

Under the usual addition, the rational numbers form a group (ℚ, +), or briefly ℚ+. Being a subgroup of ℝ+, this group has already been studied to some extent in Section 1, together with the factor group ℚ+/ℤ. We continue the investigation of these groups, we characterize them in the class of all groups, and we study their endomorphism rings.

Definition A group G is called locally cyclic, if the subgroup 〈a1, a2, …, an〉 generated by finitely many elements a1, a2, …, an of G is always cyclic, that is, this subgroup may be generated in fact by a single element of G. By induction, this is equivalent to the property that the subgroup generated by any two elements is cyclic. In particular, every locally cyclic group is abelian.

For 0 ≠ b ∈ ℚ the subgroupb〉 of ℚ+generated by b is isomorphic to 〈1〉 = ℤ+, as there is an automorphism of+mapping b to 1.

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The Classical Fields
Structural Features of the Real and Rational Numbers
, pp. 179 - 234
Publisher: Cambridge University Press
Print publication year: 2007

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  • Rational numbers
  • H. Salzmann, Eberhard-Karls-Universität Tübingen, Germany, T. Grundhöfer, Bayerische-Julius-Maximilians-Universität Würzburg, Germany, H. Hähl, Universität Stuttgart, R. Löwen, Technische Universität Carolo Wilhelmina zu Braunschweig, Germany
  • Book: The Classical Fields
  • Online publication: 07 May 2010
  • Chapter DOI: https://doi.org/10.1017/CBO9780511721502.004
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  • Rational numbers
  • H. Salzmann, Eberhard-Karls-Universität Tübingen, Germany, T. Grundhöfer, Bayerische-Julius-Maximilians-Universität Würzburg, Germany, H. Hähl, Universität Stuttgart, R. Löwen, Technische Universität Carolo Wilhelmina zu Braunschweig, Germany
  • Book: The Classical Fields
  • Online publication: 07 May 2010
  • Chapter DOI: https://doi.org/10.1017/CBO9780511721502.004
Available formats
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To save content items to your account, please confirm that you agree to abide by our usage policies. If this is the first time you use this feature, you will be asked to authorise Cambridge Core to connect with your account. Find out more about saving content to Google Drive.

  • Rational numbers
  • H. Salzmann, Eberhard-Karls-Universität Tübingen, Germany, T. Grundhöfer, Bayerische-Julius-Maximilians-Universität Würzburg, Germany, H. Hähl, Universität Stuttgart, R. Löwen, Technische Universität Carolo Wilhelmina zu Braunschweig, Germany
  • Book: The Classical Fields
  • Online publication: 07 May 2010
  • Chapter DOI: https://doi.org/10.1017/CBO9780511721502.004
Available formats
×