2021
DOI: 10.1017/s1471068421000399
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Utilizing Treewidth for Quantitative Reasoning on Epistemic Logic Programs

Abstract: Extending the popular answer set programming paradigm by introspective reasoning capacities has received increasing interest within the last years. Particular attention is given to the formalism of epistemic logic programs (ELPs) where standard rules are equipped with modal operators which allow to express conditions on literals for being known or possible, that is, contained in all or some answer sets, respectively. ELPs thus deliver multiple collections of answer sets, known as world views. Employing ELPs fo… Show more

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Cited by 3 publications
(5 citation statements)
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“…Set (S3) includes a very small set of instances of combinatorial problems. The instances in sets (S1) and (S2) have been used in previous works on ASP and counting (Eiter et al 2021;Besin et al 2021;Hecher 2022). Set (S1) encodes finding extensions of an argumentation framework (Fichte et al 2022b;Dvořák et al 2020;Gaggl et al 2020).…”
Section: Empirical Evaluationmentioning
confidence: 99%
“…Set (S3) includes a very small set of instances of combinatorial problems. The instances in sets (S1) and (S2) have been used in previous works on ASP and counting (Eiter et al 2021;Besin et al 2021;Hecher 2022). Set (S1) encodes finding extensions of an argumentation framework (Fichte et al 2022b;Dvořák et al 2020;Gaggl et al 2020).…”
Section: Empirical Evaluationmentioning
confidence: 99%
“…Analogously, we require Formulas (13), (14), and (15) for guiding provability of an auxiliary variable (x ≺ y) along the TD. and (e ≺ b) is not possible anyway due to Formulas (10).…”
Section: Bijective and Treewidth-aware Reduction To Satmentioning
confidence: 99%
“…This can be witnessed by a couple of solvers that adhere to parameterized complexity and in particular to treewidth. Some techniques for solvers on Boolean formulas at least seem to be particular wellsuited for counting problems, e.g., based on dynamic programming [49,48], hybrid solving [62,10], which also includes the winner [69,70,42] of two tracks of the most recent model counting competition [43], as well as compact knowledge compilation [32,33]. However, treewidth also allows to improve solving hard decision problems with the help of knowledge compilation [25].…”
Section: An Empirical Study Of Treewidth-aware Reductionsmentioning
confidence: 99%
See 1 more Smart Citation
“…Set (S3) includes a very small set of instances of combinatorial problems. The instances in sets (S1) and (S2) have been used in previous works on ASP and counting (Eiter et al, 2021;Besin et al, 2021;Hecher, 2022). Set (S1) encodes finding extensions of an argumentation framework (Fichte et al, 2022b;Dvořák et al, 2020;Gaggl et al, 2020).…”
Section: Empirical Evaluationmentioning
confidence: 99%