TY - JOUR
T1 - NNIL-formulas revisited
T2 - universal models and finite model property
AU - Ilin, Julia
AU - de Jongh, Dick
AU - Yang, Fan
PY - 2021/3
Y1 - 2021/3
N2 - NNIL-formulas, introduced by Visser in 1983-1984 in a study of Sigma(1)-subsitutions in Heyting arithmetic, are intuitionistic propositional formulas that do not allow nesting of implication to the left. The first results about these formulas were obtained in a paper of 1995 by Visser et al. In particular, it was shown that NNIL-formulas are exactly the formulas preserved under taking submodels of Kripke models. Recently, Bezhanishvili and de Jongh observed that NNIL-formulas are also reflected by the colour-preserving monotonic maps of Kripke models. In the present paper, we first show how this observation leads to the conclusion that NNIL-formulas are preserved by arbitrary substructures not necessarily satisfying the topo-subframe condition. Then, we apply it to construct universal models for NNIL. It follows from the properties of these universal models that NNIL-formulas are also exactly the formulas that are reflected by colour-preserving monotonic maps. By using the method developed in constructing the universal models, we give a new direct proof that the logics axiomatized by NNIL-axioms have the finite model property.
AB - NNIL-formulas, introduced by Visser in 1983-1984 in a study of Sigma(1)-subsitutions in Heyting arithmetic, are intuitionistic propositional formulas that do not allow nesting of implication to the left. The first results about these formulas were obtained in a paper of 1995 by Visser et al. In particular, it was shown that NNIL-formulas are exactly the formulas preserved under taking submodels of Kripke models. Recently, Bezhanishvili and de Jongh observed that NNIL-formulas are also reflected by the colour-preserving monotonic maps of Kripke models. In the present paper, we first show how this observation leads to the conclusion that NNIL-formulas are preserved by arbitrary substructures not necessarily satisfying the topo-subframe condition. Then, we apply it to construct universal models for NNIL. It follows from the properties of these universal models that NNIL-formulas are also exactly the formulas that are reflected by colour-preserving monotonic maps. By using the method developed in constructing the universal models, we give a new direct proof that the logics axiomatized by NNIL-axioms have the finite model property.
UR - https://researchportal.helsinki.fi/en/publications/9921cad8-6a44-4d05-b78c-c1abc313fe26
U2 - 10.1093/logcom/exaa063
DO - 10.1093/logcom/exaa063
M3 - Article
SN - 0955-792X
VL - 31
SP - 573
EP - 596
JO - Journal of Logic and Computation
JF - Journal of Logic and Computation
IS - 2
ER -