TRANSIENT CHAOS IN INTRACELLULAR DYNAMICS?

MD simulations, currently the most detailed description of the dynamic evolution of proteins, are based on the repeated solution of a set of differential equations implementing Newton's second law. Many such systems are known to exhibit chaotic behavior, i.e., very small changes in initial condition

In modelling single species with discrete, non-overlapping generations, one usually assumes that the density at time \(t+1\) is a function of the density at time \(t: N_{t+1}=f\left(N_{t}\right)\). The dynamical behaviour of this system depends on the parameters in the function \(f\). It commonly ch

In this work a recently introduced chaos suppression method [M. A. Matfas and J. G[idmez, Phys. Rev. Lett. 72 (1994) 1455-8] is applied to the two-dimensional maps due to H6non and Holmes, respectively, at parameter values for which the system exhibits a non-attracting chaotic set. First of all, it