System of controlled moving objects with the mode of the attractive cycle

A set $\Xi$ of conservative systems is considered, allowing oscillations of a given period. The problem of aggregating the set $\Xi$ into a coupled system with an attractive (in a large) cycle, in which the phase control law in the systems $\Xi$ is realized, is solved. An approach is developed in which a Van der Pol oscillator with an adjustable frequency is used as a control signal generator, acting through one-way links--control on the systems of the set $\Xi$: in the aggregated system, there are no direct links between the systems $\Xi$. The control system is described by autonomous equations.