Satisfiability algorithms for propositional logic have improved enormously in recently years. This improvement increases the attractiveness of satisfiability methods for first-order logic that reduce the problem to a series of ground-level satisfiability problems. R. Jeroslow introduced a partial instantiation method of this kind that differs radically from the standard resolution-based methods. This paper lays the theoretical groundwork for an extension of his method that is general enough and efficient enough for general logic programming with indefinite clauses. In particular we improve Jeroslow's approach by (1) extending it to logic with functions, (2) accelerating it through the use of satisfiers, as introduced by Gallo and Rago, and ...
Abstract. We consider proof systems for effectively propositional logic. First, we show that proposi...
Abstract. The logic FO(ID) extends classical first order logic with inductive definitions. This pape...
This paper presents a new partial logic that generalizes the traditional proposition and first order...
Satisfiability algorithms for propositional logic have improved enormously in recently years. This i...
Satisfiability algorithms for propositional logic have improved enormously in recently years. This i...
Satisfiability algorithms for propositional logic have improved enormously in recent years. This inc...
Recent improvements in satisfiability algorithms for propositional logic have made partial instantia...
We consider instantiation-based theorem proving whereby instances of clauses are generated by certai...
iProver is an instantiation-based theorem prover which is based on Inst-Gen calculus, complete for f...
This paper considers the fragment ∃∀SO of second-order logic. Many interesting problems, such as con...
In this paper we present a method of integrating theory reasoning into the instantiation framework. ...
Procedures for first-order logic with equality are used in many modern theorem provers and solvers, ...
We present an extension of Stålmarck's method to classical first order predicate logic. Stålmarck's ...
The logic FO(ID) extends classical first order logic with inductive definitions. This paper studies ...
: We have argued elsewhere that first order inference can be made more efficient by using non-standa...
Abstract. We consider proof systems for effectively propositional logic. First, we show that proposi...
Abstract. The logic FO(ID) extends classical first order logic with inductive definitions. This pape...
This paper presents a new partial logic that generalizes the traditional proposition and first order...
Satisfiability algorithms for propositional logic have improved enormously in recently years. This i...
Satisfiability algorithms for propositional logic have improved enormously in recently years. This i...
Satisfiability algorithms for propositional logic have improved enormously in recent years. This inc...
Recent improvements in satisfiability algorithms for propositional logic have made partial instantia...
We consider instantiation-based theorem proving whereby instances of clauses are generated by certai...
iProver is an instantiation-based theorem prover which is based on Inst-Gen calculus, complete for f...
This paper considers the fragment ∃∀SO of second-order logic. Many interesting problems, such as con...
In this paper we present a method of integrating theory reasoning into the instantiation framework. ...
Procedures for first-order logic with equality are used in many modern theorem provers and solvers, ...
We present an extension of Stålmarck's method to classical first order predicate logic. Stålmarck's ...
The logic FO(ID) extends classical first order logic with inductive definitions. This paper studies ...
: We have argued elsewhere that first order inference can be made more efficient by using non-standa...
Abstract. We consider proof systems for effectively propositional logic. First, we show that proposi...
Abstract. The logic FO(ID) extends classical first order logic with inductive definitions. This pape...
This paper presents a new partial logic that generalizes the traditional proposition and first order...