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A Generalized Discrete-Time Altafini Model

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arxiv 1802.08751 v1 pith:PD2SGOUM submitted 2018-02-23 cs.SY cs.DCcs.SY

A Generalized Discrete-Time Altafini Model

classification cs.SY cs.DCcs.SY
keywords modelgaincyclicgraphgroupwhoseagentsaltafini
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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A discrete-time modulus consensus model is considered in which the interaction among a family of networked agents is described by a time-dependent gain graph whose vertices correspond to agents and whose arcs are assigned complex numbers from a cyclic group. Limiting behavior of the model is studied using a graphical approach. It is shown that, under appropriate connectedness, a certain type of clustering will be reached exponentially fast for almost all initial conditions if and only if the sequence of gain graphs is "repeatedly jointly structurally balanced" corresponding to that type of clustering, where the number of clusters is at most the order of a cyclic group. It is also shown that the model will reach a consensus asymptotically at zero if the sequence of gain graphs is repeatedly jointly strongly connected and structurally unbalanced. In the special case when the cyclic group is of order two, the model simplifies to the so-called Altafini model whose gain graph is simply a signed graph.

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