Abstract (EN):
Abstract: This paper considers linear dynamical systems subject to additive and bounded disturbances, and studies properties of their forward reach, robust positively invariant (RPI) and the minimal RPI sets. The analysis is carried out for discrete-time (DT), continuous-time (CT), and sampled-data (SD) systems from a unified perspective. In the DT and CT cases, we review key existing results, while for the SD case novel results that reveal substantial structural differences to the DT and CT cases are presented. In particular, the main topological and computational properties associated with the DT and CT forward reach and RPI sets fail to be directly applicable to SD systems. In light of this, we introduce and develop topologically compatible notions for the SD forward reach, RPI and mRPI sets. We address and enhance computational aspects associated with these sets by complementing them with approximate, but guaranteed, and numerically more plausible notions.
Keywords: Forward Reachability, Forward Reach Sets, Robust Positive Invariance, Robust Positively Invariant Sets, Minimal Robust Positively Invariant Sets, Bounded Disturbances, Discrete-Time, Continuous-Time, Sampled-data.
Idioma:
Inglês
Tipo (Avaliação Docente):
Científica
Notas:
SYSTEC Report 2017-SC3, July 2017.
This is a preprint of an article that was mentioned as an output of research produced within the FCT project PTDC-EEI-AUT/2933-2014|16858¿TOCCATA, namely in the activities report of Dr. Sasa Rakovic when he was a PostDoc scholarship holder at Univ. Porto, funded by the FCT project. This preprint is placed in the U.Porto Repository with open access to comply with the requirements of making the project research available.
Referência:
SYSTEC Report 2017-SC3, July 2017.