First-order linear real arithmetic enriched with uninterpreted predicate symbols yields an interesting modeling language. However, satisfiability of such formulas is undecidable, even if we restrict the uninterpreted predicate symbols to arity one. In order to find decidable fragments of this language, it is necessary to restrict the expressiveness of the arithmetic part. One possible path is to confine arithmetic expressions to difference constraints of the form $x - y \mathrel{\#} c$, where $\#$ ranges over the standard relations $$ and $x,y$ are universally quantified. However, it is known that combining difference constraints with uninterpreted predicate symbols yields an undecidable satisfiability problem again. In this paper, it is sh...
First-order logic has a long tradition and is one of the most prominent and most important formalism...
International audienceWe show that infinite satisfiability can be reduced to finite satisfiabil-ity ...
"The final publication is available at http://link.springer.com/chapter/10.1007%2F978-3-319-40970-2_...
International audienceFirst-order linear real arithmetic enriched with uninterpreted predicate symbo...
International audienceFirst-order linear rational arithmetic enriched with uninterpreted predicates ...
Linear arithmetic extended with free predicate symbols is undecidable, in general. We show that the ...
In general, first-order predicate logic extended with linear integer arithmetic is undecidable. We s...
The first-order theory of addition over the natural numbers, known as Presburger arithmetic, is deci...
We introduce a new decidable fragment of first-order logic with equality, which strictly generalizes...
International audienceIn general, first-order predicate logic extended with linear integer arithmeti...
First-order logic is one of the most prominent formalisms in computer science and mathematics. Since...
We consider the Σ1 0-fragment of second-order logic over the vocabulary h+, ×, 0, 1, <, S1, ..., Ski...
One-dimensional fragment of first-order logic is obtained by restricting quantification to blocks of...
We consider the 10-fragment of second-order logic over the vocabulary h+;; 0; 1; <; S1; :::; Ski,...
International audienceThis paper investigates the satisfiability problem for Separation Logic with k...
First-order logic has a long tradition and is one of the most prominent and most important formalism...
International audienceWe show that infinite satisfiability can be reduced to finite satisfiabil-ity ...
"The final publication is available at http://link.springer.com/chapter/10.1007%2F978-3-319-40970-2_...
International audienceFirst-order linear real arithmetic enriched with uninterpreted predicate symbo...
International audienceFirst-order linear rational arithmetic enriched with uninterpreted predicates ...
Linear arithmetic extended with free predicate symbols is undecidable, in general. We show that the ...
In general, first-order predicate logic extended with linear integer arithmetic is undecidable. We s...
The first-order theory of addition over the natural numbers, known as Presburger arithmetic, is deci...
We introduce a new decidable fragment of first-order logic with equality, which strictly generalizes...
International audienceIn general, first-order predicate logic extended with linear integer arithmeti...
First-order logic is one of the most prominent formalisms in computer science and mathematics. Since...
We consider the Σ1 0-fragment of second-order logic over the vocabulary h+, ×, 0, 1, <, S1, ..., Ski...
One-dimensional fragment of first-order logic is obtained by restricting quantification to blocks of...
We consider the 10-fragment of second-order logic over the vocabulary h+;; 0; 1; <; S1; :::; Ski,...
International audienceThis paper investigates the satisfiability problem for Separation Logic with k...
First-order logic has a long tradition and is one of the most prominent and most important formalism...
International audienceWe show that infinite satisfiability can be reduced to finite satisfiabil-ity ...
"The final publication is available at http://link.springer.com/chapter/10.1007%2F978-3-319-40970-2_...