We consider the extension of first-order logic FO by unary counting quantifiers and generalise the notion of Gaifman normal form from FO to this setting. For formulas that use only ultimately periodic counting quantifiers, we provide an algorithm that computes equivalent formulas in Gaifman normal form. We also show that this is not possible for formulas using at least one quantifier that is not ultimately periodic. Now let d be a degree bound. We show that for any formula phi with arbitrary counting quantifiers, there is a formula gamma in Gaifman normal form that is equivalent to phi on all finite structures of degree <= d. If the quantifiers of phi are decidable (decidable in elementary time, ultimately periodic), gamma can be constructe...
Projet MEVAL, Projet VERSO/http://ieeexplore.ieee.org/We study the impact of adding certain families...
In this paper, we examine the computational complexity of various natural one-variable fragments of ...
This paper gives a thorough overview of what is known about first-order logic with counting quantif...
We consider the extension of first-order logic FO by unary counting quantifiers and generalise the n...
We consider the extension of first-order logic FO by unary counting quantifiers and generalise the n...
Abstract—This paper’s main result presents a 3-fold exponen-tial algorithm that transforms a first-o...
We study Gaifman locality and Hanf locality of an extension of first-order logic with modulo p count...
AbstractWe give a new construction of formulas in Hanf normal form that are equivalent to first-orde...
This paper considers the structure consisting of the set of all words over a given alphabet together...
We consider a first-order logic for the integers with addition. This logicextends classical first-or...
AbstractWe investigate the expressive power of various extensions of first-order, inductive, and inf...
We prove that, on bounded expansion classes, every first-order formula with modulo counting is equiv...
It is known that first-order logic with some counting extensions can be efficiently evaluated on gra...
Normalformen drücken semantische Eigenschaften einer Logik durch syntaktische Restriktionen aus. Sie...
AbstractFirst-order logic is known to have a severely limited expressive power on finite structures....
Projet MEVAL, Projet VERSO/http://ieeexplore.ieee.org/We study the impact of adding certain families...
In this paper, we examine the computational complexity of various natural one-variable fragments of ...
This paper gives a thorough overview of what is known about first-order logic with counting quantif...
We consider the extension of first-order logic FO by unary counting quantifiers and generalise the n...
We consider the extension of first-order logic FO by unary counting quantifiers and generalise the n...
Abstract—This paper’s main result presents a 3-fold exponen-tial algorithm that transforms a first-o...
We study Gaifman locality and Hanf locality of an extension of first-order logic with modulo p count...
AbstractWe give a new construction of formulas in Hanf normal form that are equivalent to first-orde...
This paper considers the structure consisting of the set of all words over a given alphabet together...
We consider a first-order logic for the integers with addition. This logicextends classical first-or...
AbstractWe investigate the expressive power of various extensions of first-order, inductive, and inf...
We prove that, on bounded expansion classes, every first-order formula with modulo counting is equiv...
It is known that first-order logic with some counting extensions can be efficiently evaluated on gra...
Normalformen drücken semantische Eigenschaften einer Logik durch syntaktische Restriktionen aus. Sie...
AbstractFirst-order logic is known to have a severely limited expressive power on finite structures....
Projet MEVAL, Projet VERSO/http://ieeexplore.ieee.org/We study the impact of adding certain families...
In this paper, we examine the computational complexity of various natural one-variable fragments of ...
This paper gives a thorough overview of what is known about first-order logic with counting quantif...