Ανάλυση ευστάθειας υβριδικών δυναμικών συστημάτων

doi:https://doi.org/10.12681/eadd/27756

Open AccessDissertation10.12681/eadd/27756

Ανάλυση ευστάθειας υβριδικών δυναμικών συστημάτων

Γρηγόριος Δαβράζος-2007-01-01

0

TL;DRAbstract

In this thesis we study stability for hybrid dynamical systems modelled by Differential Petri Nets.Our stability results are formulated as Linear Matrix Inequalities in order to be computational solvable. A methodology for stabilization of hybrid dynamical systems is also introduced. The notion of Networked Hybrid System is also introduced and the model of Differential Petri Net is proposed for modelling. Stability results for switched time-dealy systems are also proposed.

Chat with Paper

AI Agents for this Paper

In this thesis we study stability for hybrid dynamical systems modelled by Differential Petri Nets.Our stability results are formulated as Linear Matrix Inequalities in order to be computational solvable. A methodology for stabilization of hybrid dynamical systems is also introduced. The notion of Networked Hybrid System is also introduced and the model of Differential Petri Net is proposed for modelling. Stability results for switched time-dealy systems are also proposed.

Keywords

Petri netStability (learning theory)Hybrid systemDynamical systems theoryComputer scienceStochastic Petri netDifferential (mechanical device)Mathematics

Chat

Click to start Chat