International audienceWhen presented with a formula to prove, most theorem provers for classical first-order logic process that formula following several steps, one of which is commonly called skolemization. That process eliminates quantifier alternation within formulas by extending the language of the underlying logic with new Skolem functions and by instantiating certain quantifiers with terms built using Skolem functions. In this paper, we address the problem of checking (i.e., certifying) proof evidence that involves Skolem terms. Our goal is to do such certification without using the mathematical concepts of model-theoretic semantics (i.e., preservation of satisfiability) and choice principles (i.e., epsilon terms). Instead , our proof...
this paper including all proofs. We discuss how to analytically prove first-order theorems in contex...
Several proof formalisms have been used, and in some cases even introduced, in order to define proof...
Skolem functions play a central role in the study of first order logic, both from theoretical and pr...
International audienceWhen presented with a formula to prove, most theorem provers for classical fir...
Skolemization is a means to eliminate existential quantifiers within predicate logic sentences by r...
Skolemization is not an equivalence preserving transformation. For the purposes of refutational theo...
AbstractThe kinds of inference rules and decision procedures that one writes for proofs involving eq...
International audienceThe kinds of inference rules and decision procedures that one writes for proof...
Skolemization is a means to eliminate existential quantifiers within predicate logic sentences and t...
In any classical first-order theory that proves the existence of at least two elements, one can elim...
Skolemization is an important ingredient of automated reasoning methods in (fragments of) first-orde...
Interactive realizability is a computational semantics of classical Arithmetic. It is based on inter...
Skolemization and Herbrand theorems are obtained for first-order logics based on algebras with a com...
AbstractIn this paper an alternative Skolemization method is introduced that, for a large class of f...
One of the main issues in proof certification is that different theorem provers, even when designed ...
this paper including all proofs. We discuss how to analytically prove first-order theorems in contex...
Several proof formalisms have been used, and in some cases even introduced, in order to define proof...
Skolem functions play a central role in the study of first order logic, both from theoretical and pr...
International audienceWhen presented with a formula to prove, most theorem provers for classical fir...
Skolemization is a means to eliminate existential quantifiers within predicate logic sentences by r...
Skolemization is not an equivalence preserving transformation. For the purposes of refutational theo...
AbstractThe kinds of inference rules and decision procedures that one writes for proofs involving eq...
International audienceThe kinds of inference rules and decision procedures that one writes for proof...
Skolemization is a means to eliminate existential quantifiers within predicate logic sentences and t...
In any classical first-order theory that proves the existence of at least two elements, one can elim...
Skolemization is an important ingredient of automated reasoning methods in (fragments of) first-orde...
Interactive realizability is a computational semantics of classical Arithmetic. It is based on inter...
Skolemization and Herbrand theorems are obtained for first-order logics based on algebras with a com...
AbstractIn this paper an alternative Skolemization method is introduced that, for a large class of f...
One of the main issues in proof certification is that different theorem provers, even when designed ...
this paper including all proofs. We discuss how to analytically prove first-order theorems in contex...
Several proof formalisms have been used, and in some cases even introduced, in order to define proof...
Skolem functions play a central role in the study of first order logic, both from theoretical and pr...