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U-monad topologies of hyperfinite time lines

Published online by Cambridge University Press:  12 March 2014

Renling Jin
Renling Jin*
Affiliation:
Department of Mathematics, University of Wisconsin, Madison, Wisconsin 53706
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Abstract

In an ω1-saturated nonstandard universe a cut is an initial segment of the hyperintegers which is closed under addition. Keisler and Leth in [KL] introduced, for each given cut U, a corresponding U-topology on the hyperintegers by letting O be U-open if for any x ϵ O there is a y greater than all the elements in U such that the interval [xy, x + y] ⊆ O. Let U be a cut in a hyperfinite time line , which is a hyperfinite initial segment of the hyperintegers. The U-monad topology of is the quotient topology of the U-topological space modulo U. In this paper we answer a question of Keisler and Leth about the U-monad topologies by showing that when is κ-saturated and has cardinality κ,(1) if the coinitiality of U1, is uncountable, then the U1,-monad topology and the U2-monad topology are homcomorphic iff both U1, and U2 have the same coinitiality; and (2) can produce exactly three different U-monad topologies (up to homeomorphism) for those U's with countable coinitiality. As a corollary can produce exactly four different U-monad topologies if the cardinality of is ω1.

Type
Research Article
Information
The Journal of Symbolic Logic , Volume 57 , Issue 2 , June 1992 , pp. 534 - 539
Copyright
Copyright © Association for Symbolic Logic 1992

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References

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