Variety and generality of clustering in globally coupled oscillators

By making use of a parametric adaptive control, it is possible to synchronize, desynchronize or resynchronize a network of globally coupled chaotic oscillators in the presence of large noise. The method, based on the Kalman filter, is applied to logistic and H6non map lattices. This method can be re

A class of globally coupled one dimensional maps is studied. For the uncoupled one dimensional map it is possible to Ž compute the spectrum of Liapunov exponents exactly, and there is a natural equilibrium measure Sinai-Ruelle-Bowen . measure , so the corresponding 'typical' Liapunov exponent may al

Networks of weakly nonlinear oscillators are considered with diffusive and time-delayed coupling. Averaging theory is used to determine parameter ranges for which the network experiences amplitude death, whereby oscillations are quenched and the equilibrium solution has a large domain of attraction.