Temporal interpretation of intuitionistic quantifiers: Monadic case
Abstract
In a recent paper we showed that intuitionistic quantifiers admit the following temporal interpretation: "always in the future" (for ) and "sometime in the past" (for ). In this paper we study this interpretation for the monadic fragment of the intuitionistic predicate logic. It is well known that is translated fully and faithfully into the monadic fragment of the predicate (G\"{o}del translation). We introduce a new tense extension of , denoted by , and provide an alternative full and faithful translation of into , which yields the temporal interpretation of monadic intuitionistic quantifiers mentioned above. We compare this new translation with the G\"{o}del translation by showing that both and can be translated fully and faithfully into a tense extension of , which we denote by . This is done by utilizing the algebraic and relational semantics for the new logics introduced. As a byproduct, we prove the finite model property (fmp) for and show that the fmp for the other logics involved can be derived as a consequence of the fullness and faithfulness of the translations considered.
Cite
@article{arxiv.2009.00218,
title = {Temporal interpretation of intuitionistic quantifiers: Monadic case},
author = {Guram Bezhanishvili and Luca Carai},
journal= {arXiv preprint arXiv:2009.00218},
year = {2020}
}