Third-order functionals on partial combinatory algebras
Abstract
Computability relative to a partial function on the natural numbers can be formalized using the notion of an oracle for this function . This can be generalized to arbitrary partial combinatory algebras, yielding a notion of `adjoining a partial function to a partial combinatory algebra '. A similar construction is known for second-order functionals, but the third-order case is more difficult. In this paper, we prove several results for this third-order case. Given a third-order functional on a partial combinatory algebra , we show how to construct a partial combinatory algebra where is `computable', and which has a `lax' factorization property. Moreover, we show that, on the level of first-order functions, the effect of making a third-order functional computable can be described as adding an oracle for a first-order function.
Keywords
Cite
@article{arxiv.2103.09000,
title = {Third-order functionals on partial combinatory algebras},
author = {Jetze Zoethout},
journal= {arXiv preprint arXiv:2103.09000},
year = {2021}
}
Comments
36 pages