International audienceIn proof theory one distinguishes sequent proofs with cut and cut-free sequent proofs, while for proof complexity one distinguishes Frege-systems and extended Frege-systems. In this paper we show how deep inference can provide a uniform treatment for both classifications, such that we can define cut-free systems with extension, which is neither possible with Frege-systems, nor with the sequent calculus. We show that the propositional pigeon-hole principle admits polynomial-size proofs in a cut-free system with extension. We also define cut-free systems with substitution and show that the cut-free system with extension p-simulates the cut-free system with substitution
AbstractIn the recent past, the reduction-based and the model-based methods to prove cut elimination...
We introduce proof systems for propositional logic that admit short proofs of hard formulas as well ...
This paper is a contribution to our understanding of the relationship between uniform and nonuniform...
International audienceIn proof theory one distinguishes sequent proofs with cut and cut-free sequent...
AbstractIn proof theory one distinguishes sequent proofs with cut and cut-free sequent proofs, while...
AbstractIn Arai (1996), we introduced a new inference rule called permutation to propositional calcu...
AbstractWe present a new propositional calculus that has desirable natures with respect to both auto...
AbstractIt is known that LK, a system of propositional sequent calculus, without a cut rule (written...
In usual proof systems, like the sequent calculus, only a very limited way of combining proofs is av...
Recently a new connection between proof theory and formal language theory was introduced. It was sho...
AbstractThe cutting plane refutation system CP for propositional logic is an extension of resolution...
We study the complexity of proof systems augmenting resolution with inference rules that allow, give...
AbstractThe relation between proofs with cuts and proofs without cuts is discussed in this article. ...
AbstractResolution and cut-free LK are the most popular propositional systems used for logical autom...
We prove lower bounds of the form exp (n " d ) ; " d ? 0; on the length of proofs of an ...
AbstractIn the recent past, the reduction-based and the model-based methods to prove cut elimination...
We introduce proof systems for propositional logic that admit short proofs of hard formulas as well ...
This paper is a contribution to our understanding of the relationship between uniform and nonuniform...
International audienceIn proof theory one distinguishes sequent proofs with cut and cut-free sequent...
AbstractIn proof theory one distinguishes sequent proofs with cut and cut-free sequent proofs, while...
AbstractIn Arai (1996), we introduced a new inference rule called permutation to propositional calcu...
AbstractWe present a new propositional calculus that has desirable natures with respect to both auto...
AbstractIt is known that LK, a system of propositional sequent calculus, without a cut rule (written...
In usual proof systems, like the sequent calculus, only a very limited way of combining proofs is av...
Recently a new connection between proof theory and formal language theory was introduced. It was sho...
AbstractThe cutting plane refutation system CP for propositional logic is an extension of resolution...
We study the complexity of proof systems augmenting resolution with inference rules that allow, give...
AbstractThe relation between proofs with cuts and proofs without cuts is discussed in this article. ...
AbstractResolution and cut-free LK are the most popular propositional systems used for logical autom...
We prove lower bounds of the form exp (n " d ) ; " d ? 0; on the length of proofs of an ...
AbstractIn the recent past, the reduction-based and the model-based methods to prove cut elimination...
We introduce proof systems for propositional logic that admit short proofs of hard formulas as well ...
This paper is a contribution to our understanding of the relationship between uniform and nonuniform...