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All realizability is relative

Published online by Cambridge University Press:  28 September 2006

PIETER J. W. HOFSTRA
Affiliation:
University of Ottawa, Department of Mathematics and Statistics, 585 King Edward Avenue, K1N 5N6 Ottawa, ON, Canada. e-mail: [email protected]

Abstract

We introduce a category of basic combinatorial objects, encompassing PCAs and locales. Such a basic combinatorial object is to be thought of as a pre-realizability notion. To each such object we can associate an indexed preorder, generalizing the construction of triposes for various notions of realizability. There are two main results: first, the characterization of triposes which arise in this way, in terms of ordered PCAs equipped with a filter. This will include “Effective Topos-like” triposes, but also the triposes for relative, modified and extensional realizability and the dialectica tripos. Localic triposes can be identified as those arising from ordered PCAs with a trivial filter. Second, we give a classification of geometric morphisms between such triposes in terms of maps of the underlying combinatorial objects. Altogether, this shows that the category of ordered PCAs with non-trivial filters serves as a framework for studying a wide variety of realizability notions.

Type
Research Article
Copyright
2006 Cambridge Philosophical Society

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