Bases, spanning sets, and the axiom of choice

Mathematical Logic Quarterly 53 (3):247-254 (2007)
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Abstract

Two theorems are proved: First that the statement“there exists a field F such that for every vector space over F, every generating set contains a basis”implies the axiom of choice. This generalizes theorems of Halpern, Blass, and Keremedis. Secondly, we prove that the assertion that every vector space over ℤ2 has a basis implies that every well-ordered collection of two-element sets has a choice function

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10.1002/malq.200610043

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Citations of this work

On vector spaces over specific fields without choice.Paul Howard & Eleftherios Tachtsis - 2013 - Mathematical Logic Quarterly 59 (3):128-146.

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A graph theoretic equivalent to the axiom of choice.Hartmut Höft & Paul Howard - 1973 - Mathematical Logic Quarterly 19 (11‐12):191-191.

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