G
Giovanni Russo
Researcher at University of Salerno
Publications - 105
Citations - 2253
Giovanni Russo is an academic researcher from University of Salerno. The author has contributed to research in topics: Synchronization (computer science) & Nonlinear system. The author has an hindex of 20, co-authored 102 publications receiving 1742 citations. Previous affiliations of Giovanni Russo include University of Naples Federico II & University of Catania.
Papers
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Global entrainment of transcriptional systems to periodic inputs
TL;DR: Through the use of contraction theory, a powerful tool from dynamical systems theory, it is shown that certain systems driven by external periodic signals have the property that all their solutions converge to a fixed limit cycle.
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On QUAD, Lipschitz, and Contracting Vector Fields for Consensus and Synchronization of Networks
TL;DR: The usefulness of the links highlighted in this paper to obtain proofs of asymptotic synchronization in networks of identical nonlinear oscillators are illustrated via numerical simulations on some representative examples.
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A network model of Italy shows that intermittent regional strategies can alleviate the COVID-19 epidemic
Fabio Della Rossa,Fabio Della Rossa,Davide Salzano,Anna Di Meglio,Francesco De Lellis,Marco Coraggio,Carmela Calabrese,Agostino Guarino,Ricardo Cardona-Rivera,Pietro De Lellis,Davide Liuzza,Francesco Lo Iudice,Giovanni Russo,Mario di Bernardo +13 more
TL;DR: This work confirms the effectiveness at the regional level of the national lockdown strategy and proposes coordinated regional interventions to prevent future national lockdowns, while avoiding saturation of the regional health systems and mitigating impact on costs.
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Synchronization and control of complex networks via contraction, adaptation and evolution
TL;DR: A mathematical model usually considered in the literature to describe a complex network which uses appropriate equations to describe the node dynamics, the coupling protocol and the network topology is proposed.
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Contraction Theory and Master Stability Function: Linking Two Approaches to Study Synchronization of Complex Networks
Giovanni Russo,M. di Bernardo +1 more
TL;DR: Novel sufficient criteria for the fulfillment of a synchronous state are derived and the contraction theory is applied to the synchronization of a network.