We report on an investigation aimed at identifying small fragments of set theory (typically, sublanguages of Multi-Level Syllogistic) endowed with polynomial-time satisfiability decision tests, potentially useful for automated proof verification. Leaving out of consideration the membership relator ∈ for the time being, in this paper we provide a complete taxonomy of the polynomial and the NP-complete fragments involving, besides variables intended to range over the von Neumann set-universe, the Boolean operators ∪ ∩ , the Boolean relators ⫅, ⊈,=, ≠, and the predicates '• = Ø' and 'Disj(•, •)', meaning 'the argument set is empty' and 'the arguments are disjoint sets', along with their opposites '• ≠ Ø and '¬Disj(•, •)'. We also examine in detail how to test for satisfiability the formulae of six sample fragments: three sample problems are shown to be NP-complete, two to admit quadratic-time decision algorithms, and one to be solvable in linear time.

Complexity Assessments for Decidable Fragments of Set Theory. I: A Taxonomy for the Boolean Case

Cantone D.;De Domenico A.;Maugeri P.;
2021-01-01

Abstract

We report on an investigation aimed at identifying small fragments of set theory (typically, sublanguages of Multi-Level Syllogistic) endowed with polynomial-time satisfiability decision tests, potentially useful for automated proof verification. Leaving out of consideration the membership relator ∈ for the time being, in this paper we provide a complete taxonomy of the polynomial and the NP-complete fragments involving, besides variables intended to range over the von Neumann set-universe, the Boolean operators ∪ ∩ , the Boolean relators ⫅, ⊈,=, ≠, and the predicates '• = Ø' and 'Disj(•, •)', meaning 'the argument set is empty' and 'the arguments are disjoint sets', along with their opposites '• ≠ Ø and '¬Disj(•, •)'. We also examine in detail how to test for satisfiability the formulae of six sample fragments: three sample problems are shown to be NP-complete, two to admit quadratic-time decision algorithms, and one to be solvable in linear time.
2021
Boolean set theory
Computable set theory
Expressibility
NP-completeness
Proof verification
Satisfiability problem
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/20.500.11769/518902
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