Repository | Book | Chapter
(2011) Foundational theories of classical and constructive mathematics, Dordrecht, Springer.
The principle of set theory known as the Axiom of Choice ( AC) has been hailed as "probably the most interesting and, in spite of its late appearance, the most discussed axiom of mathematics, second only to Euclid's axiom of parallels which was introduced more than two thousand years ago". It has been employed in countless mathematical papers, a number of monographs have been exclusively devoted to it, and it has long played a prominently role in discussions on the foundations of mathematics.
Publication details
DOI: 10.1007/978-94-007-0431-2_8
Full citation:
Bell, J. L. (2011)., The axiom of choice in the foundations of mathematics, in G. Sommaruga (ed.), Foundational theories of classical and constructive mathematics, Dordrecht, Springer, pp. 157-169.
This document is unfortunately not available for download at the moment.