English

A set-theoretical approach for ABox reasoning services (Extended Version)

Logic in Computer Science 2024-02-22 v7

Abstract

In this paper we consider the most common ABox reasoning services for the description logic DL4LQSR, ⁣×(D)\mathcal{DL}\langle \mathsf{4LQS^{R,\!\times}}\rangle(\mathbf{D}) (DLD4, ⁣×\mathcal{DL}_{\mathbf{D}}^{4,\!\times}, for short) and prove their decidability via a reduction to the satisfiability problem for the set-theoretic fragment \flqsr. The description logic DLD4, ⁣×\mathcal{DL}_{\mathbf{D}}^{4,\!\times} is very expressive, as it admits various concept and role constructs, and data types, that allow one to represent rule-based languages such as SWRL. Decidability results are achieved by defining a generalization of the conjunctive query answering problem, called HOCQA (Higher Order Conjunctive Query Answering), that can be instantiated to the most wide\-spread ABox reasoning tasks. We also present a \ke\space based procedure for calculating the answer set from DLD4, ⁣×\mathcal{DL}_{\mathbf{D}}^{4,\!\times} knowledge bases and higher order DLD4, ⁣×\mathcal{DL}_{\mathbf{D}}^{4,\!\times} conjunctive queries, thus providing means for reasoning on several well-known ABox reasoning tasks. Our calculus extends a previously introduced \ke\space based decision procedure for the CQA problem.

Keywords

Cite

@article{arxiv.1702.03096,
  title  = {A set-theoretical approach for ABox reasoning services (Extended Version)},
  author = {Domenico Cantone and Marianna Nicolosi-Asmundo and Daniele Francesco Santamaria},
  journal= {arXiv preprint arXiv:1702.03096},
  year   = {2024}
}

Comments

27 pages. Extended version for RR 2017. arXiv admin note: text overlap with arXiv:1606.07337

R2 v1 2026-06-22T18:14:39.620Z