Verification of continuous systems remains one of the main obstacles in the safety verification of hybrid systems. In this paper, by exploiting the structure of linear dynamical systems, we convert the exact safety verification of linear systems with certain eigen-structure as an emptiness problem for a semi-algebraic set. Sum of squares (SOS) decomposition is then employed to check emptiness of the set defined by polynomial equalities and inequalities which can be effectively computed by semidefinite programming
Continuous linear dynamical systems are used extensively in mathematics, computer science, physics, ...
This thesis proposes a practical framework for the verification and synthesis of hybrid systems, tha...
This paper identifies an industrially relevant class of linear hybrid automata (LHA) called reasonab...
In this paper we investigate safety analysis or reachability of timed automata hybrid systems as an ...
One of the main obstacles in the safety analysis of continuous and hybrid systems has been the compu...
Semi-algebraic abstraction is an approach to the safety verification problem for polynomial dynamica...
We study linear hybrid automata with dynamics of the form $\sum a_i x_i \leq a$ and $\sum b_i {\dot ...
Safety is closely related to set invariance for dynamical systems. However, synthesizing a safe inva...
An embedded software controller is safe if the composition of the controller and the plant does not ...
International audienceSafety verification of hybrid dynamical systems relies crucially on the abilit...
Abstract. A barrier certificate is an inductive invariant function which can be used for the safety ...
Safety verification of hybrid systems is undecidable, except for very special cases. In this paper, ...
Abstract: "We introduce a fixedpoint algorithm for verifying safety properties of hybrid systems wit...
Safety verification determines whether any trajectory starting from admissible initial states would ...
This paper deals with the problem of safety verification of nonlinear hybrid systems. We start from ...
Continuous linear dynamical systems are used extensively in mathematics, computer science, physics, ...
This thesis proposes a practical framework for the verification and synthesis of hybrid systems, tha...
This paper identifies an industrially relevant class of linear hybrid automata (LHA) called reasonab...
In this paper we investigate safety analysis or reachability of timed automata hybrid systems as an ...
One of the main obstacles in the safety analysis of continuous and hybrid systems has been the compu...
Semi-algebraic abstraction is an approach to the safety verification problem for polynomial dynamica...
We study linear hybrid automata with dynamics of the form $\sum a_i x_i \leq a$ and $\sum b_i {\dot ...
Safety is closely related to set invariance for dynamical systems. However, synthesizing a safe inva...
An embedded software controller is safe if the composition of the controller and the plant does not ...
International audienceSafety verification of hybrid dynamical systems relies crucially on the abilit...
Abstract. A barrier certificate is an inductive invariant function which can be used for the safety ...
Safety verification of hybrid systems is undecidable, except for very special cases. In this paper, ...
Abstract: "We introduce a fixedpoint algorithm for verifying safety properties of hybrid systems wit...
Safety verification determines whether any trajectory starting from admissible initial states would ...
This paper deals with the problem of safety verification of nonlinear hybrid systems. We start from ...
Continuous linear dynamical systems are used extensively in mathematics, computer science, physics, ...
This thesis proposes a practical framework for the verification and synthesis of hybrid systems, tha...
This paper identifies an industrially relevant class of linear hybrid automata (LHA) called reasonab...