Invariant sets are a key ingredient for verifying safety and other properties of cyber-physical systems that mix discrete and continuous dynamics. We adapt the elimination-theoretic Rosenfeld-Gr\"{o}bner algorithm to systematically obtain algebraic invariants of polynomial dynamical systems without using Gr\"{o}bner bases or quantifier elimination. We identify totally real varieties as an important class for efficient invariance checking
AbstractThis paper is about algorithmic invariant theory as it is required within equivariant dynami...
We present a set of conditions enabling a polynomial system of ordinary differential equations in th...
AbstractWe propose a decision procedure for algebraically closed fields based on a quantifier elimin...
International audienceThis paper presents a method for generating semi-algebraic invariants for syst...
We develop new upper bounds for several effective differential elimination techniques for systems of...
Abstract We prove that any invariant algebraic set of a given polynomial vector field can be algebra...
International audienceSemi-algebraic abstraction is an approach to the safety verification problem f...
Dynamical systems model the time evolution of both natural and engineered processes. The automatic a...
This book starts with an overview of the research of Gröbner bases which have many applications in v...
Hybrid systems are dynamical systems with interacting discrete computation and continuous physical p...
International audienceThis paper studies sound proof rules for checking positive invariance of algeb...
AbstractThe aim of this paper is to introduce two new elimination procedures for algebraic systems o...
The 1)rimary focus of this work is the design and implementation of efficient differential eliminati...
Abstract. We present a powerful computational method for automat-ically generating polynomial invari...
The qualitative theory of dynamical systems is concerned with studying the long time behavior discre...
AbstractThis paper is about algorithmic invariant theory as it is required within equivariant dynami...
We present a set of conditions enabling a polynomial system of ordinary differential equations in th...
AbstractWe propose a decision procedure for algebraically closed fields based on a quantifier elimin...
International audienceThis paper presents a method for generating semi-algebraic invariants for syst...
We develop new upper bounds for several effective differential elimination techniques for systems of...
Abstract We prove that any invariant algebraic set of a given polynomial vector field can be algebra...
International audienceSemi-algebraic abstraction is an approach to the safety verification problem f...
Dynamical systems model the time evolution of both natural and engineered processes. The automatic a...
This book starts with an overview of the research of Gröbner bases which have many applications in v...
Hybrid systems are dynamical systems with interacting discrete computation and continuous physical p...
International audienceThis paper studies sound proof rules for checking positive invariance of algeb...
AbstractThe aim of this paper is to introduce two new elimination procedures for algebraic systems o...
The 1)rimary focus of this work is the design and implementation of efficient differential eliminati...
Abstract. We present a powerful computational method for automat-ically generating polynomial invari...
The qualitative theory of dynamical systems is concerned with studying the long time behavior discre...
AbstractThis paper is about algorithmic invariant theory as it is required within equivariant dynami...
We present a set of conditions enabling a polynomial system of ordinary differential equations in th...
AbstractWe propose a decision procedure for algebraically closed fields based on a quantifier elimin...