The stable model semantics was recently generalized by Ferraris, Lee and Lifschitz to the full first-order language with a syntax translation approach that is very similar to McCarthy's circumscription. In this paper, we investigate the decidability and undecidability of various fragments of first-order language under both semantics of stable models and circumscription. Some maximally decidable classes and undecidable classes are identified. The results obtained in the paper show that the boundaries between decidability and undecidability for these two semantics are very different in spite of the similarity of definition. Moreover, for all fragments considered in the paper, decidability under the semantics of circumscription coincides with ...
In this paper we define computationally well-behaved versions of classical first-order logic and pro...
The computational problem of model checking for circumscription of firstorder formulae is studied. W...
We investigate the decidability of the definability problem for fragments of first order logic over ...
The stable model semantics was recently generalized by Ferraris, Lee and Lifschitz to the full first...
The stable model semantics was recently generalized by Ferraris, Lee and Lifschitz to the full first...
The guarded fragment and its extensions and subfragments are often considered as a framework for in...
We identify a number of decidable and undecidable fragments of first-order concatenation theory. We ...
Circumscription has been used to formalize the nonmonotonic aspects of common-sense reasoning. The s...
We survey decidable and undecidable satis ability problems for fragments of rstorder logic and be...
abstract: It is well-known that first-order logic is semi-decidable. Therefore, first-order logic is...
First-order logic is one of the most prominent formalisms in computer science and mathematics. Since...
This paper focuses on computing first-order theories under either stable model semantics or circumsc...
AbstractMany natural specifications use types. We investigate the decidability of fragments of many-...
This paper focuses on computing first-order theo-ries under either stable model semantics or circum-...
We investigate expressiveness and definability issues with respect to minimal models, particularly i...
In this paper we define computationally well-behaved versions of classical first-order logic and pro...
The computational problem of model checking for circumscription of firstorder formulae is studied. W...
We investigate the decidability of the definability problem for fragments of first order logic over ...
The stable model semantics was recently generalized by Ferraris, Lee and Lifschitz to the full first...
The stable model semantics was recently generalized by Ferraris, Lee and Lifschitz to the full first...
The guarded fragment and its extensions and subfragments are often considered as a framework for in...
We identify a number of decidable and undecidable fragments of first-order concatenation theory. We ...
Circumscription has been used to formalize the nonmonotonic aspects of common-sense reasoning. The s...
We survey decidable and undecidable satis ability problems for fragments of rstorder logic and be...
abstract: It is well-known that first-order logic is semi-decidable. Therefore, first-order logic is...
First-order logic is one of the most prominent formalisms in computer science and mathematics. Since...
This paper focuses on computing first-order theories under either stable model semantics or circumsc...
AbstractMany natural specifications use types. We investigate the decidability of fragments of many-...
This paper focuses on computing first-order theo-ries under either stable model semantics or circum-...
We investigate expressiveness and definability issues with respect to minimal models, particularly i...
In this paper we define computationally well-behaved versions of classical first-order logic and pro...
The computational problem of model checking for circumscription of firstorder formulae is studied. W...
We investigate the decidability of the definability problem for fragments of first order logic over ...