Uncertainty as to whether or not a system has a chaotic attractor

Abstract: Attracting chaotic behaviour in dynamical systems is often sensitive to small changes in parameters. If a perturbation in the parameter by a tiny amount ε can change the asymptotic behaviour of the system from being chaotic to being periodic, we call it parameter value ε-uncertain. Here, using a selfsimilar model of the intricate, intertwined parameter-space structure of the chaotic and periodic attractors, we investigate the scaling of this uncertainty with ε. We show that as ε approaches 0, the great majorit… Show more

“…There is probably a delicate interplay here between the parameters in the problem, and the size of this invariant set. Recently, Joglekar et al ( [19], [20]) discuss this issue by defining "ǫ-uncertaintity" in case of dynamical system and explained that how a small perturbation in parameter value changes the asymptotic behavior of the system. This is still an interesting open question.…”

Finite Time Blow-up in a Delayed Diffusive Population Model with Competitive Interference

“…There is probably a delicate interplay here between the parameters in the problem, and the size of this invariant set. Recently, Joglekar et al ( [19], [20]) discuss this issue by defining "ǫ-uncertaintity" in case of dynamical system and explained that how a small perturbation in parameter value changes the asymptotic behavior of the system. This is still an interesting open question.…”

Finite Time Blow-up in a Delayed Diffusive Population Model with Competitive Interference