M
Marco Ariola
Researcher at Parthenope University of Naples
Publications - 199
Citations - 5851
Marco Ariola is an academic researcher from Parthenope University of Naples. The author has contributed to research in topics: Tokamak & Control theory. The author has an hindex of 33, co-authored 189 publications receiving 5106 citations. Previous affiliations of Marco Ariola include European Atomic Energy Community & University of Naples Federico II.
Papers
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Technical Communique: Finite-time control of linear systems subject to parametric uncertainties and disturbances
TL;DR: Finite-time control problems for linear systems subject to time-varying parametric uncertainties and to exogenous constant disturbances are considered and a sufficient condition for robust finite-time stabilization via state feedback is provided.
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Technical communique: Finite-time stabilization via dynamic output feedback
TL;DR: The assumption that the state is available for feedback is removed and the output feedback problem is investigated, and a sufficient condition for the design of a dynamic output feedback controller which makes the closed loop system finite-time stable is provided.
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Finite-time control of discrete-time linear systems
Francesco Amato,Marco Ariola +1 more
TL;DR: This note considers the finite-time stabilization of discrete-time linear systems subject to disturbances generated by an exosystem and finds some sufficient conditions for the existence of an output feedback controller guaranteeing finite- time stability.
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Finite-Time Stability of Linear Time-Varying Systems: Analysis and Controller Design
TL;DR: The note deals with the finite-time analysis and design problems for continuous-time, time-varying linear systems and sufficient conditions for the solvability of both the state and the output feedback problems are stated.
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Technical communique: Finite-time stability of linear time-varying systems with jumps
TL;DR: The paper provides a necessary and sufficient condition for finite-time stability, requiring a test on the state transition matrix of the system under consideration, and a sufficient condition involving two coupled differential-difference linear matrix inequalities.