Abstract

) 1 J. M. E. Hyland 2 C.-H. L. Ong 3 University of Cambridge, England Abstract This paper is motivated by the discovery that an appropriate quotient SN 3 of the strongly normalising untyped 3-terms (where 3 is just a formal constant) forms a partial applicative structure with the inherent application operation. The quotient structure satisfies all but one of the axioms of a partial combinatory algebra (pca). We call such partial applicative structures conditionally partial combinatory algebras (c-pca). Remarkably, an arbitrary right-absorptive c-pca gives rise to a tripos provided the underlying intuitionistic predicate logic is given an interpretation in the style of Kreisel's modified realizability, as opposed to the standard Kleenestyle realizability. Starting from an arbitrary right-absorptive c-pca U , the tripos-to-topos construction due to Hyland et al. can then be carried out to build a modified realizability topos TOPm (U ) of non-standard sets equipped with an equali...

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