A Cut-free Sequent Calculus for Basic Intuitionistic Dynamic Topological Logic
Abstract
As part of a broader family of logics, [1, 3] introduced two key logical systems: , which encapsulates the basic logical structure of dynamic topological systems, and , which provides a well-behaved yet sufficiently general framework for an abstract notion of implication. These logics have been thoroughly examined through their algebraic, Kripke-style, and topological semantics. To complement these investigations with their missing proof-theoretic analysis, this paper introduces a cut-free G3-style sequent calculus for and . Using these systems, we demonstrate that they satisfy the disjunction property and, more broadly, admit a generalization of Visser's rules. Additionally, we establish that enjoys the Craig interpolation property and that its sequent system possesses the deductive interpolation property.
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Cite
@article{arxiv.2502.09456,
title = {A Cut-free Sequent Calculus for Basic Intuitionistic Dynamic Topological Logic},
author = {Amirhossein Akbar Tabatabai and Majid Alizadeh and Alireza Mahmoudian},
journal= {arXiv preprint arXiv:2502.09456},
year = {2025}
}
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41 pages