Termination analysis of linear loops plays a key rôle in several areas of computer science, including program verification and abstract interpretation. Already for the simplest variants of linear loops the question of termination relates to deep open problems in number theory, such as the decidability of the Skolem and Positivity Problems for linear recurrence sequences, or equivalently reachability questions for discrete-time linear dynamical systems. In this article, we introduce the class of o-minimal invariants, which is broader than any previously considered, and study the decidability of the existence and algorithmic synthesis of such invariants as certificates of non-termination for linear loops equipped with a large class of halting...
AbstractThe classical technique for proving termination of a generic sequential computer program inv...
We consider the MSO model-checking problem for simple linear loops, or equivalently discrete-time li...
Continuous linear dynamical systems are used extensively in mathematics, computer science, physics, ...
The termination analysis of linear loops plays a key role in several areas of computer science, incl...
Termination analysis of linear loops plays a key rôle in several areas of computer science, includin...
International audienceWe consider the MSO model-checking problem for simple linear loops, or equival...
We show that termination of a class of linear loop programs is decidable. Linear loop programs are ...
We survey the state of the art on the algorithmic analysis of discrete linear dynamical systems, foc...
We consider the problem of deciding termination of single-path while loops with integer variables, a...
Termination proof synthesis for simple loops, i.e., loops with only conjoined constraints in the loo...
The object of this thesis is the study of the decidability properties of linear dynamical systems, w...
AbstractTiwari (2004) proved that the termination problem of a class of linear programs (loops with ...
A fundamental problem in program verification con-cerns the termination of simple linear loops of th...
The objective of this thesis is to shed some light on the boundaries of decidability by answering so...
We present the first approach to prove non-termination of integer programs that is based on loop acc...
AbstractThe classical technique for proving termination of a generic sequential computer program inv...
We consider the MSO model-checking problem for simple linear loops, or equivalently discrete-time li...
Continuous linear dynamical systems are used extensively in mathematics, computer science, physics, ...
The termination analysis of linear loops plays a key role in several areas of computer science, incl...
Termination analysis of linear loops plays a key rôle in several areas of computer science, includin...
International audienceWe consider the MSO model-checking problem for simple linear loops, or equival...
We show that termination of a class of linear loop programs is decidable. Linear loop programs are ...
We survey the state of the art on the algorithmic analysis of discrete linear dynamical systems, foc...
We consider the problem of deciding termination of single-path while loops with integer variables, a...
Termination proof synthesis for simple loops, i.e., loops with only conjoined constraints in the loo...
The object of this thesis is the study of the decidability properties of linear dynamical systems, w...
AbstractTiwari (2004) proved that the termination problem of a class of linear programs (loops with ...
A fundamental problem in program verification con-cerns the termination of simple linear loops of th...
The objective of this thesis is to shed some light on the boundaries of decidability by answering so...
We present the first approach to prove non-termination of integer programs that is based on loop acc...
AbstractThe classical technique for proving termination of a generic sequential computer program inv...
We consider the MSO model-checking problem for simple linear loops, or equivalently discrete-time li...
Continuous linear dynamical systems are used extensively in mathematics, computer science, physics, ...