Synthesizing Strongly Equivalent Logic Programs: Beth Definability for Answer Set Programs via Craig Interpolation in First-Order Logic
Abstract
We show a projective Beth definability theorem for logic programs under the stable model semantics: For given programs and and vocabulary (set of predicates) the existence of a program in such that and are strongly equivalent can be expressed as a first-order entailment. Moreover, our result is effective: A program can be constructed from a Craig interpolant for this entailment, using a known first-order encoding for testing strong equivalence, which we apply in reverse to extract programs from formulas. As a further perspective, this allows transforming logic programs via transforming their first-order encodings. In a prototypical implementation, the Craig interpolation is performed by first-order provers based on clausal tableaux or resolution calculi. Our work shows how definability and interpolation, which underlie modern logic-based approaches to advanced tasks in knowledge representation, transfer to answer set programming.
Cite
@article{arxiv.2402.07696,
title = {Synthesizing Strongly Equivalent Logic Programs: Beth Definability for Answer Set Programs via Craig Interpolation in First-Order Logic},
author = {Jan Heuer and Christoph Wernhard},
journal= {arXiv preprint arXiv:2402.07696},
year = {2024}
}
Comments
Preprint version of the IJCAR 2024 contribution