AbstractIn 1985, van den Dries showed that the theory of the reals with a predicate for the integer powers of two admits quantifier elimination in an expanded language, and is hence decidable. He gave a model-theoretical argument, which provides no apparent bounds on the complexity of a decision procedure. We provide a syntactical argument that yields a procedure that is primitive recursive, although not elementary. In particular, we show that it is possible to eliminate a single block of existential quantifiers in time 2O(n)0, where n is the length of the input formula and 2kx denotes k-fold iterated exponentiation
We give a new quantifier elimination procedure for Presburger arithmetic extended with a unary count...
International audienceWe describe a new quantifier elimination algorithm for real closed fields base...
AbstractWe study existential and universal quantification over quantifiers, i.e. quantification wher...
In 1985, van den Dries showed that the theory of the reals with a predicate for the integer powers o...
AbstractIn 1985, van den Dries showed that the theory of the reals with a predicate for the integer ...
This series of papers presents a complete development and complexity analysis of a decision method, ...
We propose a new quantifier elimination algorithm for the theory of linear real arithmetic. This alg...
An algorithm is presented which eliminates second-order quantifiers over predicate variables in form...
We show that quantifier elimination over real closed fields can require doubly exponential space (an...
It is well known that quantifier elimination plays a relevant role in proving decidability of theori...
A general mechanism to extend decision algorithms to deal with additional predicates is described. T...
AbstractThe decision problem for the theory of integers under addition, or “Presburger Arithmetic,” ...
International audienceWe study a variant of the real quantifier elimination problem (QE). The varian...
Abstract. We present a fully proof-producing implementation of a quantifier elimination procedure fo...
In this paper we give a new algorithm for quantifier elimination in the first order theory of real c...
We give a new quantifier elimination procedure for Presburger arithmetic extended with a unary count...
International audienceWe describe a new quantifier elimination algorithm for real closed fields base...
AbstractWe study existential and universal quantification over quantifiers, i.e. quantification wher...
In 1985, van den Dries showed that the theory of the reals with a predicate for the integer powers o...
AbstractIn 1985, van den Dries showed that the theory of the reals with a predicate for the integer ...
This series of papers presents a complete development and complexity analysis of a decision method, ...
We propose a new quantifier elimination algorithm for the theory of linear real arithmetic. This alg...
An algorithm is presented which eliminates second-order quantifiers over predicate variables in form...
We show that quantifier elimination over real closed fields can require doubly exponential space (an...
It is well known that quantifier elimination plays a relevant role in proving decidability of theori...
A general mechanism to extend decision algorithms to deal with additional predicates is described. T...
AbstractThe decision problem for the theory of integers under addition, or “Presburger Arithmetic,” ...
International audienceWe study a variant of the real quantifier elimination problem (QE). The varian...
Abstract. We present a fully proof-producing implementation of a quantifier elimination procedure fo...
In this paper we give a new algorithm for quantifier elimination in the first order theory of real c...
We give a new quantifier elimination procedure for Presburger arithmetic extended with a unary count...
International audienceWe describe a new quantifier elimination algorithm for real closed fields base...
AbstractWe study existential and universal quantification over quantifiers, i.e. quantification wher...