Add to ORKGThe purpose of this note is to observe a generalization of the concept "computable in..." to arbitrary partial combinatory algebras. For every partial combinatory algebra (pca) A and every partial endofunction on A, a pca A[f] is constructed such that in A[f], the function f is representable by an element; a universal property of the construction is formulated in terms of Longley's 2-category of pcas and decidable applicative morphisms. It is proved that there is always a geometric inclusion from the realizability topos on A[f] into the one on A and that there is a meaningful preorder on the partial endofunctions on A which generalizes Turing reducibility
We employ the notions of ‘sequential function’ and ‘interrogation’ (dialogue) in order to define new...
Abstract. Geometric morphisms between realizability toposes are studied in terms of morphisms betwee...
We employ the notions of ‘sequential function’ and ‘interrogation’ (dialogue) in order to define new...
The purpose of this note is to observe a generalization of the concept "computable in..." to arbitra...
The purpose of this note is to observe a generalization of the concept “computable in... ” to arbitr...
The notion of Relative Realizability was dened in see also The idea is that instead of doing re...
The notion of Relative Realizability was dened in see also The idea is that instead of doing re...
We exhibit a way of “forcing a partial functional to be realizable as effective operation” for arbit...
We exhibit a way of “forcing a partial functional to be realizable as effective operation” for arbit...
We exhibit a way of “forcing a partial functional to be realizable as effective operation” for arbit...
We exhibit a way of “forcing a partial functional to be realizable as effective operation” for arbit...
A partial combinatory algebra (PCA) is a model of computation that embodies a certain notion of algo...
We employ the notions of ‘sequential function’ and ‘interrogation’ (dialogue) in order to define new...
We exhibit a way of “forcing a functional to be an effective operation” for arbitrary partial combin...
Geometric morphisms between realizability toposes are studied in terms of morphisms between partial ...
We employ the notions of ‘sequential function’ and ‘interrogation’ (dialogue) in order to define new...
Abstract. Geometric morphisms between realizability toposes are studied in terms of morphisms betwee...
We employ the notions of ‘sequential function’ and ‘interrogation’ (dialogue) in order to define new...
The purpose of this note is to observe a generalization of the concept "computable in..." to arbitra...
The purpose of this note is to observe a generalization of the concept “computable in... ” to arbitr...
The notion of Relative Realizability was dened in see also The idea is that instead of doing re...
The notion of Relative Realizability was dened in see also The idea is that instead of doing re...
We exhibit a way of “forcing a partial functional to be realizable as effective operation” for arbit...
We exhibit a way of “forcing a partial functional to be realizable as effective operation” for arbit...
We exhibit a way of “forcing a partial functional to be realizable as effective operation” for arbit...
We exhibit a way of “forcing a partial functional to be realizable as effective operation” for arbit...
A partial combinatory algebra (PCA) is a model of computation that embodies a certain notion of algo...
We employ the notions of ‘sequential function’ and ‘interrogation’ (dialogue) in order to define new...
We exhibit a way of “forcing a functional to be an effective operation” for arbitrary partial combin...
Geometric morphisms between realizability toposes are studied in terms of morphisms between partial ...
We employ the notions of ‘sequential function’ and ‘interrogation’ (dialogue) in order to define new...
Abstract. Geometric morphisms between realizability toposes are studied in terms of morphisms betwee...
We employ the notions of ‘sequential function’ and ‘interrogation’ (dialogue) in order to define new...