Dynamical properties of a dissipative discontinuous map: A scaling investigation

Abstract

The effects of dissipation on the scaling properties of nonlinear discontinuous maps are investigated by analyzing the behavior of the average squared action < I2 > as a function of the n-th iteration of the map as well as the parameters K and γ, controlling nonlinearity and dissipation, respectively. We concentrate our efforts to study the case where the nonlinearity is large; i.e., K 1. In this regime and for large initial action I0 K, we prove that dissipation produces an exponential decay for the average action < I >. Also, for I0 0, we describe the behavior of < I2 > using a scaling function and analytically obtain critical exponents which are used to overlap different curves of < I2 > onto an universal plot. We complete our study with the analysis of the scaling properties of the deviation around the average action ω.