International audienceThe Orbit Problem consists of determining, given a matrix A on Q d , together with vectors x and y, whether the orbit of x under repeated applications of A can ever reach y. This problem was famously shown to be decidable by Kannan and Lipton in the 1980s. In this paper, we are concerned with the problem of synthesising suitable invariants P ⊆ R d , i.e., sets that are stable under A and contain x but not y, thereby providing compact and versatile certificates of non-reachability. We show that whether a given instance of the Orbit Problem admits a semialge-braic invariant is decidable, and moreover in positive instances we provide an algorithm to synthesise suitable succinct invariants of polynomial size. Fijalkow et a...
An action of a group on a vector space partitions the latter into a set of orbits. We consider three...
Underapproximations (UAs) of backward reachable sets play an important role in controller synthesis ...
AbstractWe examine computational problems on quaternion matrix and rotation semigroups. It is shown ...
The Orbit Problem consists of determining, given a matrix A on Qd, together with vectors x and y, wh...
The Orbit Problem consists of determining, given a linear transformation A on Qd, together with vect...
The Orbit Problem consists of determining, given a linear transformation A on Qd , together with vec...
The \emph{Orbit Problem} consists of determining, given a linear transformation $A$ on $\mathbb{Q}^d...
Orbit Problems are a class of fundamental reachability questions that arise in the analysis of discr...
We study a parametric version of the Kannan-Lipton Orbit Problem for linear dynamical systems. We sh...
Continuous linear dynamical systems are used extensively in mathematics, computer science, physics, ...
We consider higher-dimensional versions of Kannan and Lipton's Orbit Problem---determining whether a...
We consider higher-dimensional versions of Kannan and Lipton's Orbit Problem|determining whether a t...
We study fundamental decision problems on linear dynamical systems in discrete time. We focus on pse...
Reachability analysis is a powerful tool which is being used extensively and efficiently for the ana...
We study fundamental reachability problems on pseudo-orbits of linear dynamical systems. Pseudo-orbi...
An action of a group on a vector space partitions the latter into a set of orbits. We consider three...
Underapproximations (UAs) of backward reachable sets play an important role in controller synthesis ...
AbstractWe examine computational problems on quaternion matrix and rotation semigroups. It is shown ...
The Orbit Problem consists of determining, given a matrix A on Qd, together with vectors x and y, wh...
The Orbit Problem consists of determining, given a linear transformation A on Qd, together with vect...
The Orbit Problem consists of determining, given a linear transformation A on Qd , together with vec...
The \emph{Orbit Problem} consists of determining, given a linear transformation $A$ on $\mathbb{Q}^d...
Orbit Problems are a class of fundamental reachability questions that arise in the analysis of discr...
We study a parametric version of the Kannan-Lipton Orbit Problem for linear dynamical systems. We sh...
Continuous linear dynamical systems are used extensively in mathematics, computer science, physics, ...
We consider higher-dimensional versions of Kannan and Lipton's Orbit Problem---determining whether a...
We consider higher-dimensional versions of Kannan and Lipton's Orbit Problem|determining whether a t...
We study fundamental decision problems on linear dynamical systems in discrete time. We focus on pse...
Reachability analysis is a powerful tool which is being used extensively and efficiently for the ana...
We study fundamental reachability problems on pseudo-orbits of linear dynamical systems. Pseudo-orbi...
An action of a group on a vector space partitions the latter into a set of orbits. We consider three...
Underapproximations (UAs) of backward reachable sets play an important role in controller synthesis ...
AbstractWe examine computational problems on quaternion matrix and rotation semigroups. It is shown ...