Back to Search Start Over

Completeness and Decidability in Sequence Logic.

Authors :
Carbonell, Jaime G.
Siekmann, Jörg
Dershowitz, Nachum
Voronkov, Andrei
Bezem, Marc
Langholm, Tore
Walicki, Michał
Source :
Logic for Programming, Artificial Intelligence & Reasoning (9783540755586); 2007, p123-137, 15p
Publication Year :
2007

Abstract

Sequence logic is a parameterized logic where the formulas are sequences of formulas of some arbitrary underlying logic. The sequence formulas are interpreted in certain linearly ordered sets of models of the underlying logic. This interpretation induces an entailment relation between sequence formulas which strongly depends on which orderings one wishes to consider. Some important classes are: all linear orderings, all dense linear orderings and all (or some specific) wellorderings. For all these classes one can ask for a sound and complete proof system for the entailment relation, as well as for its decidability. For the class of dense linear orderings and all linear orderings we give sound and complete proof systems which also yield decidability (assuming that the underlying logic is sound, complete and decidable). We formulate some open problems on the entailment relation in the case of wellorderings. [ABSTRACT FROM AUTHOR]

Details

Language :
English
ISBNs :
9783540755586
Database :
Complementary Index
Journal :
Logic for Programming, Artificial Intelligence & Reasoning (9783540755586)
Publication Type :
Book
Accession number :
33289131
Full Text :
https://doi.org/10.1007/978-3-540-75560-9_11