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Main Authors: Cicolani, Chiara, Continelli, Elisa, Pignotti, Cristina
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2407.06647
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author Cicolani, Chiara
Continelli, Elisa
Pignotti, Cristina
author_facet Cicolani, Chiara
Continelli, Elisa
Pignotti, Cristina
contents In this paper, we deal with first and second-order alignment models with non-universal interaction, time delay and possible lack of connection between the agents. More precisely, we analyze the situation in which the system's agents do not transmit information to all the other agents and also agents that are linked to each other can suspend their interaction at certain times. Moreover, we take into account of possible time lags in the interactions. To deal with the considered "non-universal" connection, a graph topology over the structure of the model has to be considered. Under a so-called Persistence Excitation Condition, we establish the exponential convergence to consensus for both models whenever the digraph that describes the interaction between the agents is strongly connected.
format Preprint
id arxiv_https___arxiv_org_abs_2407_06647
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle First and second-order Cucker-Smale models with non-universal interaction, time delay and communication failures
Cicolani, Chiara
Continelli, Elisa
Pignotti, Cristina
Optimization and Control
In this paper, we deal with first and second-order alignment models with non-universal interaction, time delay and possible lack of connection between the agents. More precisely, we analyze the situation in which the system's agents do not transmit information to all the other agents and also agents that are linked to each other can suspend their interaction at certain times. Moreover, we take into account of possible time lags in the interactions. To deal with the considered "non-universal" connection, a graph topology over the structure of the model has to be considered. Under a so-called Persistence Excitation Condition, we establish the exponential convergence to consensus for both models whenever the digraph that describes the interaction between the agents is strongly connected.
title First and second-order Cucker-Smale models with non-universal interaction, time delay and communication failures
topic Optimization and Control
url https://arxiv.org/abs/2407.06647