Abstract
We describe how we formalised the meta-theory of Melvin Fitting’s dual-tableaux calculi for intuitionistic logic using the HOL4 interactive theorem prover. The paper is intended for readers familiar with dual-tableaux who might be interested in, but daunted by, the idea of formalising the required notions in a modern interactive theorem prover.
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Notes
- 1.
The predicates tab_val_aux R pv x sfss and sfs_val_aux R pv y sf may be false only at worlds \(x = \texttt {u}\) and \(y = \texttt {v}\) respectively, where u and v are different future worlds of w, which make tab_val_aux R pv w sfss and sfs_val_aux R pv w {sf} equal (both false); however adding context may change the valuation to make it true at world u but not v, or vice versa, which would make tab_val_aux R pv w esfss and sfs_val_aux R pv w esf unequal. This doesn’t suggest a flaw in Fitting’s proof, rather that the level of detail he gives doesn’t indicate precisely the sequence of lemmata to be used.
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We are grateful to the anonymous reviewers for their suggestions for improvements.
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Dawson, J.E., Goré, R. (2018). Machine-Checked Meta-theory of Dual-Tableaux for Intuitionistic Logic. In: Golińska-Pilarek, J., Zawidzki, M. (eds) Ewa Orłowska on Relational Methods in Logic and Computer Science. Outstanding Contributions to Logic, vol 17. Springer, Cham. https://doi.org/10.1007/978-3-319-97879-6_10
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