Realizability with a Local Operator of A.M. Pitts

TL;DR

This paper explores a realizability framework with a local operator, demonstrating that it characterizes hyperarithmetical functions and supports a nonstandard arithmetic interpretation with unique logical properties.

Contribution

It introduces a realizability interpretation using a local operator, linking it to hyperarithmetical functions and nonstandard arithmetic within a nonclassical universe.

Findings

Representable functions are exactly the hyperarithmetical functions.

Provides a realizability interpretation of nonstandard arithmetic.

Shows the universe where the interpretation lives has unique logical features.

Abstract

We study a notion of realizability with a local operator J which was first considered by A.M. Pitts in his thesis. Using the Suslin-Kleene theorem, we show that the representable functions for this realizability are exactly the hyperarithmetical functions. We show that there is a realizability interpretation of nonstandard arithmetic, which, despite its classical character, lives in a very nonclassical universe, where the Uniformity Principle holds and Konig's Lemma fails. We conjecture that the local operator gives a useful indexing of the hyperarithmetical functions.