Topological horseshoes for perturbations of singular difference equations

Abstract: In this paper, we study solutions of difference equations λ (y n , y n+1 ,. .. , y n+m) = 0, n ∈ Z, of order m with parameter λ, and consider the case when λ has a singular limit depending on a single variable as λ → λ 0 , i.e. λ 0 (y 0 ,. .. , y m) = ϕ(y N), where N is an integer with 0 N m and ϕ is a function. We prove that if ϕ has k simple zeros then for λ close enough to λ 0 , the difference equation has a k-horseshoe among its solutions, that is, the dynamics is conjugate to the full shift with k symbols… Show more

“…When the persistent habits last for 2 periods, we analyze the possibility of chaos in the horseshoe structure which provides a sufficient condition for the occurrence of entropic chaos. When persistent habits last for n periods, no graphic methodology can be used and we utilize the theorems developed by Juang et al [17] and Li and Malkin [19] to provide a sufficient condition for the existence of entropic chaos. This result in the last case can be applied to any positive integer n. …”

“…It shows that the critical value θ * * depends on the length of the persistent habits (n). To study the possibility of chaos for an n-D dynamical system, we modify the theorems of [17] and [19] to prove the occurrence of entropic chaos. 10 …”

“…Then on [B, C] n+1 , the function Φ η is C 1 for each η and is continuous in η 10 A simple version of the theorems of [17] and [19] is given in the Appendix. and so are the partial derivatives ∂ i Φ η for 1 ≤ i ≤ n + 1.…”

“…Our goal in the present paper is to give rigorous proofs (instead of numerical experiments) for conditions generating entropic chaos. Hence, we adopt a newly-developed method by Juang et al [17] and Li and Malkin [19] to approximate an n-D dynamical system by using a 1-D dynamical system and study the possibility of entropic chaos; also refer to Li et al [20].…”

Habit formation and chaotic dynamics in an n-dimensional cash-in-advance economy

“…When the persistent habits last for 2 periods, we analyze the possibility of chaos in the horseshoe structure which provides a sufficient condition for the occurrence of entropic chaos. When persistent habits last for n periods, no graphic methodology can be used and we utilize the theorems developed by Juang et al [17] and Li and Malkin [19] to provide a sufficient condition for the existence of entropic chaos. This result in the last case can be applied to any positive integer n. …”

“…It shows that the critical value θ * * depends on the length of the persistent habits (n). To study the possibility of chaos for an n-D dynamical system, we modify the theorems of [17] and [19] to prove the occurrence of entropic chaos. 10 …”

“…Then on [B, C] n+1 , the function Φ η is C 1 for each η and is continuous in η 10 A simple version of the theorems of [17] and [19] is given in the Appendix. and so are the partial derivatives ∂ i Φ η for 1 ≤ i ≤ n + 1.…”

“…Our goal in the present paper is to give rigorous proofs (instead of numerical experiments) for conditions generating entropic chaos. Hence, we adopt a newly-developed method by Juang et al [17] and Li and Malkin [19] to approximate an n-D dynamical system by using a 1-D dynamical system and study the possibility of entropic chaos; also refer to Li et al [20].…”

Habit formation and chaotic dynamics in an n-dimensional cash-in-advance economy

“…Because it is much more difficult to study a 2D dynamical system than a 1D dynamical system, we apply a recent method developed by Juang et al (2005) and Li and Malkin (2006) to approximate a 2D dynamical system by using a 1D dynamical system and identify the existence of entropic chaos (positive topological entropy) when both the inter-temporal elasticity of substitution and the total factor productivity are sufficiently high and when agents rely heavily on current information to form their expectations.…”

Chaotic dynamics in an overlapping generations model with myopic and adaptive expectations

Chaotic invariant sets of a delayed discrete neural network of two non-identical neurons