Forcing in nonstandard analysis

Annals of Pure and Applied Logic 68 (3):263-297 (1994)
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Abstract

A nonstandard universe is constructed from a superstructure in a Boolean-valued model of set theory. This provides a new framework of nonstandard analysis with which methods of forcing are incorporated naturally. Various new principles in this framework are provided together with the following applications: An example of an 1-saturated Boolean ultrapower of the real number field which is not Scott complete is constructed. Infinitesimal analysis based on the generic extension of the hyperreal numbers is provided, and the hull completeness theorem and the Loeb measure construction are extended to objects in the generic extension of the internal universe. The reduction theory of the Boolean-valued complex numbers are developed as a prototype of the applications to the topological reduction theory of Boolean sheaves or operator algebras.

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10.1016/0168-0072(94)90023-x

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Citations of this work

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The Trend of Logic and Foundation of Mathematics in Japan in 1991 to 1996.Yuzuru Kakuda - 1997 - Annals of the Japan Association for Philosophy of Science 9 (2):95-110.

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References found in this work

The theory of Boolean ultrapowers.Richard Mansfield - 1971 - Annals of Mathematical Logic 2 (3):297-323.
The theory of boolean ultrapowers.Richard Mansfield - 1971 - Annals of Mathematical Logic 2 (3):297.
Remarks on the nonstandard real axis.Elias Zakon - 1969 - In W. A. J. Luxemburg (ed.), Applications of model theory to algebra, analysis, and probability. New York,: Holt, Rinehart and Winston. pp. 195--227.
An Infinitesimal Approach to Stochastic Analysis.H. Jerome Keisler - 1986 - Journal of Symbolic Logic 51 (3):822-824.

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