Superreal number
In abstract algebra, the superreal numbers are a class of extensions of the real numbers, introduced by H. Garth Dales and W. Hugh Woodin as a generalization of the hyperreal numbers and primarily of interest in non-standard analysis, model theory, and the study of Banach algebras. The field of superreals is itself a subfield of the surreal numbers.
Dales and Woodin's superreals are distinct from the super-real numbers of David O. Tall, which are lexicographically ordered fractions of formal power series over the reals.[1]
Formal Definition
Suppose X is a Tychonoff space, also called a T3.5 space, and C(X) is the algebra of continuous real-valued functions on X. Suppose P is a prime ideal in C(X). Then the factor algebra A = C(X)/P is by definition an integral domain which is a real algebra and which can be seen to be totally ordered. The field of fractions F of A is a superreal field if F strictly contains the real numbers , so that F is not order isomorphic to .
If the prime ideal P is a maximal ideal, then F is a field of hyperreal numbers (Robinson's hyperreals being a very special case).
References
- ↑ Tall, David (March 1980), "Looking at graphs through infinitesimal microscopes, windows and telescopes" (PDF), Mathematical Gazette, 64 (427): 22–49, doi:10.2307/3615886, JSTOR 3615886
Bibliography
- Dales, H. Garth; Woodin, W. Hugh (1996), Super-real fields, London Mathematical Society Monographs. New Series, 14, The Clarendon Press Oxford University Press, ISBN 978-0-19-853991-9, MR 1420859
- Gillman, L.; Jerison, M. (1960), Rings of Continuous Functions, Van Nostrand, ISBN 0442026919