Universal bifurcation property of two- or higher-dimensional dissipative systems in parameter space: Why does 1D symbolic dynamics work so well?
Abstract
The universal bifurcation property of the H\'enon map in parameter space is studied with symbolic dynamics. The universal-L region is defined to characterize the bifurcation universality. It is found that the universal-L region for relative small L is not restricted to very small b values. These results show that it is also a universal phenomenon that universal sequences with short period can be found in many nonlinear dissipative systems.
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