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O-MINIMALISM

Published online by Cambridge University Press:  25 June 2014

HANS SCHOUTENS
HANS SCHOUTENS*
Affiliation:
DEPARTMENT OF MATHEMATICS, THE GRADUATE CENTER, CUNY, 365 FIFTH AVENUE, NEW YORK, NY 10016E-mail:[email protected]
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Abstract

This paper is devoted to o-minimalism, the study of the first-order properties of o-minimal structures. The main protagonists are the pseudo-o-minimal structures, that is to say, the models of the theory of all o-minimal L-structures, but we start with a more in-depth analysis of the well-known fragment DCTC (Definable Completeness/Type Completeness), and show how it already admits many of the properties of o-minimal structures: dimension theory, monotonicity, Hardy structures, and quasi-cell decomposition, provided one replaces finiteness by discreteness in all of these. Failure of cell decomposition leads to the related notion of a eukaryote structure, and we give a criterium for a pseudo-o-minimal structure to be eukaryote.

To any pseudo-o-minimal structure, we can associate its Grothendieck ring, which in the non-o-minimal case is a nontrivial invariant. To study this invariant, we identify a third o-minimalistic property, the Discrete Pigeonhole Principle, which in turn allows us to define discretely valued Euler characteristics. As an application, we study certain analytic subsets, called Taylor sets.

Keywords

o-minimalitytame structurespseudo-o-minimalo-minimalism
Type
Articles
Information
The Journal of Symbolic Logic , Volume 79 , Issue 2 , June 2014 , pp. 355 - 409
Copyright
Copyright © The Association for Symbolic Logic 2014 

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