We propose a new approach to formalize alternating pushdown systems as natural-deduction style inference systems. In this approach, the decidability of reachability can be proved as a simple consequence of a cut-elimination theorem for the corresponding inference system. Then, we show how this result can be used to extend an alternating pushdown system into a complete system where, for every configuration $A$, either $A$ or $\neg A$ is provable. The key idea is that cut-elimination permits to build a system where a proposition of the form $\neg A$ has a co-inductive (hence possibly infinite) proof if and only if it has an inductive (hence finite) proof
Originating from work in operations research the cutting plane refutation system CP is an extension ...
This is the first book on cut-elimination in first-order predicate logic from an algorithmic point o...
AbstractDeduction modulo is a way to combine computation and deduction in proofs, by applying the in...
We propose a new approach to formalize alternating pushdown systems as natural-deduction style infe...
We investigate the determinacy strength of infinite games whose winning sets are recognized by nonde...
National audienceWe are interested in the problem of expressiveness of the following operations in t...
AbstractProof search has been used to specify a wide range of computation systems. In order to build...
International audienceWe present a method to prove the decidability of provability in several well-k...
We apply the symbolic analysis principle to pushdown systems. We represent (possibly in nite) sets o...
We study pushdown systems where control states, stack alphabet, and transition relation, instead of ...
Proof search has been used to specify a wide range of computation systems. In order to build a frame...
AbstractIn the recent past, the reduction-based and the model-based methods to prove cut elimination...
International audienceTwo main lines have been adopted to prove the cut elimination theorem: the syn...
Canonical inference rules and canonical systems are defined in the frameworkof non-strict single-con...
AbstractIn proof theory one distinguishes sequent proofs with cut and cut-free sequent proofs, while...
Originating from work in operations research the cutting plane refutation system CP is an extension ...
This is the first book on cut-elimination in first-order predicate logic from an algorithmic point o...
AbstractDeduction modulo is a way to combine computation and deduction in proofs, by applying the in...
We propose a new approach to formalize alternating pushdown systems as natural-deduction style infe...
We investigate the determinacy strength of infinite games whose winning sets are recognized by nonde...
National audienceWe are interested in the problem of expressiveness of the following operations in t...
AbstractProof search has been used to specify a wide range of computation systems. In order to build...
International audienceWe present a method to prove the decidability of provability in several well-k...
We apply the symbolic analysis principle to pushdown systems. We represent (possibly in nite) sets o...
We study pushdown systems where control states, stack alphabet, and transition relation, instead of ...
Proof search has been used to specify a wide range of computation systems. In order to build a frame...
AbstractIn the recent past, the reduction-based and the model-based methods to prove cut elimination...
International audienceTwo main lines have been adopted to prove the cut elimination theorem: the syn...
Canonical inference rules and canonical systems are defined in the frameworkof non-strict single-con...
AbstractIn proof theory one distinguishes sequent proofs with cut and cut-free sequent proofs, while...
Originating from work in operations research the cutting plane refutation system CP is an extension ...
This is the first book on cut-elimination in first-order predicate logic from an algorithmic point o...
AbstractDeduction modulo is a way to combine computation and deduction in proofs, by applying the in...