6 research outputs found
Equality-friendly well-founded semantics and applications to description logics
We tackle the problem of deļ¬ning a well-founded semantics (WFS) for Datalog rules with existentially quantiļ¬ed variables in their heads and nega- tions in their bodies. In particular, we provide a WFS for the recent DatalogĀ± family of ontology languages, which covers several important description logics (DLs). To do so, we generalize DatalogĀ± by non-stratiļ¬ed nonmonotonic nega- tion in rule bodies, and we deļ¬ne a WFS for this generalization via guarded ļ¬xed point logic. We refer to this approach as equality-friendly WFS, since it has the advantage that it does not make the unique name assumption (UNA); this brings it close to OWL and its proļ¬les as well as typical DLs, which also do not make the UNA. We prove that for guarded DatalogĀ± with negation under the equality- friendly WFS, conjunctive query answering is decidable, and we provide precise complexity results for this problem. From these results, we obtain precise deļ¬- nitions of the standard WFS extensions of EL and of members of the DL-Lite family, as well as corresponding complexity results for query answering
Nonmonotonic Ontological and Rule-Based Reasoning with Extended Conceptual Logic Programs
We present extended conceptual logic programs (ECLPs), for which reasoning is decidable and, moreover, can be reduced to finite answer set programming