Work in the project was performed mostly along the following lines:
(1) Width-based generic decidability notions.
Regarding the objective to establish generic model-theoretic criteria for decidability of certain reasoning problems (satisfiability and query answering) in expressive logical formalisms, we managed to establish results based on the notion of clique-width (ICDT 2023) which was subsequently extended to partition-width (PODS 2023, LMCS 2024). Regarding the important class of first-order rewritable rule sets, a class known to be decidable via proof-theoretic means, we found that answering regular path queries in general is undecidable (KR 2024), which greatly improved our understanding of the decidability boundaries. A recently obtained technical result (PODS 2025) might constitute an important step forward in settling the so-called FUS-FC conjecture (which, if answered positively, would indeed prove that FO-rewriteable rulesets fall under the semantic notions established by us).
(2) Exact complexity analyses of query answering in popular KR formalisms.
We have obtained improved, optimal complexity bounds for very expressive Description Logics with path expressions (IJCAI 2019, JAIR 2023, IJCAI 2024, LMCS 2024). Likewise we have shown an exponential jump in complexity of conjunctive query answering when adding the Self-operator to the description logic ALC (AAAI 2023), a result quite unexpected and surprising to us, since this construct has proven rather "well behaved" in all contexts considered so far.
Finally, we extended our investigations from arbitrary-model semantics to finite-model semantics, following a general trend in current research on logic-based KR. Among others, we managed to show the finite-model property of the very expressive triguarded fragment of first-order logic, thereby also clarifying its decidability (LICS 2021b)
(3) Understanding Chase Termination.
The Chase is a very popular concept in database theory, denoting a procedure whose guaranteed termination ensures decidability. We established that all-database-terminating Skolem chase is very restricted in expressivity (confined to PTime queries) while terminating standard- and core chase allow for a much higher expressivity (ICDT 2019). We were able to establish the exceptional result that all-instance terminating standard chase in fact captures *all* decidable homomorphism-closed queries (KR 2021, Ray Reiter Best Paper Award).
(4) Decidability of Formalisms with Counting Capabilities
We also have made significant progress in the extension of standard KR formalisms by extended quantitative modelling features including certain arithmetical relationships. We obtained that decidability and even complexity is preserved when adding such features to certain logics, while in other settings, undecidability immediately follows (ECAI 2020). We also designed a decidable extension of monadic second-order logic (MSO) over trees by advanced counting capabilities, integrating and surpassing the pre-existing formalisms counting MSO as well as Boolean Algebra with Presburger Arithmetic (CSL 2024).
(5) Advanced KR features: Nonmonotonic and Multi-Perspective Reasoning
Wefocused on the classical field of belief revision and provided generic model-theoretic characterizations of fundamental postulates in that area (RuleML+RR 2022). We also widened the scope of our research to multi-perspective reasoning, proposing and investigating the new framework of “Standpoint Logics” (FOIS 2021, ISWC 2022, KR 2023, IJCAI 2023, KR 2024)
