Abstract
We show a model construction for a system of higher-order illative combinatory logic $\mathcal{I}_\omega$, thus establishing its strong consistency. We also use a variant of this construction to provide a complete embedding of first-order intuitionistic predicate logic with second-order propositional quantifiers into the system $\mathcal{I}_0$ of Barendregt, Bunder and Dekkers, which gives a partial answer to a question posed by these authors.
Citation
łukasz Czajka. "Higher-order illative combinatory logic." J. Symbolic Logic 78 (3) 837 - 872, September 2013. https://doi.org/10.2178/jsl.7803080
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