AbstractWhen investigating the complexity of cut-elimination in first-order logic, a natural subproblem is the elimination of quantifier-free cuts. So far, the problem has only been considered in the context of general cut-elimination, and the upper bounds that have been obtained are essentially double exponential. In this note, we observe that a method due to Dale Miller can be applied to obtain an exponential upper bound
25 pages, final version, accepted for publication at LMCS, special issue for CSL 2012International a...
In this paper we give a new algorithm for quantifier elimination in the first order theory of real c...
We show that quantifier elimination over real closed fields can require doubly exponential space (an...
AbstractWhen investigating the complexity of cut-elimination in first-order logic, a natural subprob...
We present sharpened lower bounds on the size of cut free proofs for first-order logic. Prior lower ...
Free-cut elimination allows cut elimination to be carried out in the presence of non-logical axioms....
The worst-case complexity of cut elimination in sequent calculi for first order based logics is inve...
This is the first book on cut-elimination in first-order predicate logic from an algorithmic point o...
We prove a general form of \u27free-cut elimination\u27 for first-order theories in linear logic, yi...
Sufficient conditions for first order based sequent calculi to admit cut elimination by a Schütte-Ta...
AbstractSufficient conditions for first-order-based sequent calculi to admit cut elimination by a Sc...
AbstractFree-cut elimination allows cut elimination to be carried out in the presence of non-logical...
International audienceWe prove a general form of 'free-cut elimination' for first-order theories in ...
We describe in full detail a solution to the problem of proving the cut elimination theorem for FILL...
This paper considers the structure consisting of the set of all words over a given alphabet together...
25 pages, final version, accepted for publication at LMCS, special issue for CSL 2012International a...
In this paper we give a new algorithm for quantifier elimination in the first order theory of real c...
We show that quantifier elimination over real closed fields can require doubly exponential space (an...
AbstractWhen investigating the complexity of cut-elimination in first-order logic, a natural subprob...
We present sharpened lower bounds on the size of cut free proofs for first-order logic. Prior lower ...
Free-cut elimination allows cut elimination to be carried out in the presence of non-logical axioms....
The worst-case complexity of cut elimination in sequent calculi for first order based logics is inve...
This is the first book on cut-elimination in first-order predicate logic from an algorithmic point o...
We prove a general form of \u27free-cut elimination\u27 for first-order theories in linear logic, yi...
Sufficient conditions for first order based sequent calculi to admit cut elimination by a Schütte-Ta...
AbstractSufficient conditions for first-order-based sequent calculi to admit cut elimination by a Sc...
AbstractFree-cut elimination allows cut elimination to be carried out in the presence of non-logical...
International audienceWe prove a general form of 'free-cut elimination' for first-order theories in ...
We describe in full detail a solution to the problem of proving the cut elimination theorem for FILL...
This paper considers the structure consisting of the set of all words over a given alphabet together...
25 pages, final version, accepted for publication at LMCS, special issue for CSL 2012International a...
In this paper we give a new algorithm for quantifier elimination in the first order theory of real c...
We show that quantifier elimination over real closed fields can require doubly exponential space (an...