Recognizable Realizability
Abstract
We introduce a notion of realizability with ordinal Turing machines based on recognizability rather than computability, i.e., the ability to uniquely identify an object. We show that the arising concept of r-realizabilty has the property that all axioms of Kripke-Platek set theory are r-realizable and that the set of r-realizable statements is closed under intuitionistic provability.
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