English

Nonmonotonic Logics and Semantics

Artificial Intelligence 2007-05-23 v2 Logic in Computer Science Logic

Abstract

Tarski gave a general semantics for deductive reasoning: a formula a may be deduced from a set A of formulas iff a holds in all models in which each of the elements of A holds. A more liberal semantics has been considered: a formula a may be deduced from a set A of formulas iff a holds in all of the "preferred" models in which all the elements of A hold. Shoham proposed that the notion of "preferred" models be defined by a partial ordering on the models of the underlying language. A more general semantics is described in this paper, based on a set of natural properties of choice functions. This semantics is here shown to be equivalent to a semantics based on comparing the relative "importance" of sets of models, by what amounts to a qualitative probability measure. The consequence operations defined by the equivalent semantics are then characterized by a weakening of Tarski's properties in which the monotonicity requirement is replaced by three weaker conditions. Classical propositional connectives are characterized by natural introduction-elimination rules in a nonmonotonic setting. Even in the nonmonotonic setting, one obtains classical propositional logic, thus showing that monotonicity is not required to justify classical propositional connectives.

Keywords

Cite

@article{arxiv.cs/0202018,
  title  = {Nonmonotonic Logics and Semantics},
  author = {Daniel Lehmann},
  journal= {arXiv preprint arXiv:cs/0202018},
  year   = {2007}
}

Comments

28 pages. Misprint corrected 15/04/02