Title :
On completeness of the μ-calculus
Author_Institution :
Inst. of Inf., Warsaw Univ.
Abstract :
The long-standing problem of the complete axiomatization of the propositional μ-calculus introduced by D. Kozen (1983) is addressed. The approach can be roughly described as a modified tableau method in the sense that infinite trees labeled with sets of formulas are investigated. The tableau method has already been used in the original paper by Kozen. The reexamination of the general tableau method presented is due to advances in automata theory, especially S. Safra´s determinization procedure (1988), connections between automata on infinite trees and games, and experience with the model checking. A finitary complete axiom system for the μ-calculus is obtained. It can be roughly described as a system for propositional modal logic with the addition of a induction rule to reason about least fixpoints
Keywords :
automata theory; formal logic; inference mechanisms; trees (mathematics); μ-calculus completeness; automata theory; complete axiomatization; determinization procedure; finitary complete axiom system; formula sets; games; induction rule; infinite trees; least fixpoints; model checking; modified tableau method; propositional μ-calculus; propositional modal logic; tableau method; Application software; Automata; Calculus; Carbon capture and storage; Game theory; Hardware; Informatics; Logic; Page description languages; Software systems;
Conference_Titel :
Logic in Computer Science, 1993. LICS '93., Proceedings of Eighth Annual IEEE Symposium on
Conference_Location :
Montreal, Que.
Print_ISBN :
0-8186-3140-6
DOI :
10.1109/LICS.1993.287593
