History-dependent synchronization in the Burridge-Knopoff model
Abstract
A three-blocks Burridge-Knopoff model is investigated. The dimensionless velocity-dependent friction force F(v) (1+av)-1 is linearized around a=0. In this way, the model is transformed into a six-dimensional mapping x(tn) x(tn+1), where tn are time moments when a block starts to move or stops. Between these moments, the equations of motion are integrable. For a<0.1, the motion is quasiperiodic or periodic, depending on the initial conditions. For the periodic solution, we observe a synchronization of the motion of the lateral blocks. For a>0.1, the motion becomes chaotic. These results are true for the linearized mapping, linearized numerical and non-linearized numerical solutions.
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