Computing Complex Horseshoes by Means of Piecewise Maps
From MaRDI portal
Publication:4560135
DOI10.1142/S0218127418300392zbMath1403.37043arXiv1806.06748OpenAlexW3103893347WikidataQ128985723 ScholiaQ128985723MaRDI QIDQ4560135
Jesús M. Seoane, Alvar Daza, Álvaro G. López, Miguel A. F. Sanjuán
Publication date: 5 December 2018
Published in: International Journal of Bifurcation and Chaos (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1806.06748
Cites Work
- Unnamed Item
- Unnamed Item
- An algorithm to automatically detect the Smale horseshoes
- Fractal basin boundaries
- On the abundance of aperiodic behaviour for maps on the interval
- Basins of Wada
- Wada basin boundaries and basin cells
- Wada property in systems with delay
- On non-linear differential equations of the second order. II. The equation \(\ddot y+kf(y)\dot y+g(y,k)=p(t)=p_1(t)+kp_2(t)\); \(k>0,f(y)\geq 1\)
- FRACTAL AND WADA EXIT BASIN BOUNDARIES IN TOKAMAKS
- A SIMPLE METHOD FOR FINDING TOPOLOGICAL HORSESHOES
- Symbolic dynamics and Markov partitions
- Partially controlling transient chaos in the Lorenz equations
- Simple mathematical models with very complicated dynamics
- Differentiable dynamical systems
- Chaos
- On Non-Linear Differential Equations of the Second Order: I. the Equation y¨ − k (1-y 2 )y˙ + y = b λk cos(λl + α), k Large
- A second order differential equation with singular solutions
This page was built for publication: Computing Complex Horseshoes by Means of Piecewise Maps
