References
- Alexander JC, Yorke JA, You Z, et al. Riddled basin. Int J Bifurcation Chaos. 1992;2:795–813.
- Ashwin P, Buescu J, Stewart I. Bubbling of attractors and synchronization of chaotic oscillators. Phys Lett A. 1994;193:126–139.
- Ashwin P, Buescu J, Stewart I. From attractor to chaotic saddle: a tale of transverse instability. Nonlinearity. 1996;9:703–737.
- Ashwin P, Terry JR. On riddling and weak attractors. Physica D. 2000;142:87–100.
- Buescu J. Exotic attractors: from Liapunov stability to riddled basins. Basel (Switzerland): Birkhäuser Verlag; 1997.
- Lai Y-C, Tél T. Transient chaos: complex dynamics on finite-time scales. New York (NY): Springer; 2011.
- Ott E, Sommerer JC, Alexander JC, et al. Scaling behaviour of chaotic systems with riddled basins. Phys Rev Lett. 1993;71:4134–4137.
- Ott E, Alexander JC, Kan I, et al. The transition to chaotic attractors with riddled basins. Physica D. 1994;76:384–410.
- Sommerer JC, Ott E. A physical system with qualitatively uncertain dynamics. Nature. 1993;365:138–140.
- Milnor J. On the concept of attractor. Commun Math Phys. 1985;99:177–195.
- Podvigina O, Ashwin P. On local attraction properties and a stability index for heteroclinic connections. Nonlinearity. 2011;24:887–929.
- Lohse A. Attraction properties and non-asymptotic stability of simple heteroclinic cycles and networks in [PhD thesis]. Hamburg: University of Hamburg; 2014. Available from: http://ediss.sub.uni-hamburg.de/volltexte/2014/6795
- Castro SBSD, Lohse A. Stability in simple heteroclinic networks in . Dyn Syst. 2014;29(4):451–481.
- Keller G. Stability index for chaotically driven concave maps. J London Math Soc.2014;89:603–622.
- Crandall R, Pomerance C. Prime numbers: a computational perspective. 2nd ed. New York (NY): Science+Business Media; 2005.
- Mohd Roslan UA. Stability index for riddled basins of attraction with applications to skew product systems [PhD thesis]. Exeter: University of Exeter; 2015. Available from: http://hdl.handle.net/10871/16683
- Jordan T, Naudot V, Young T. Higher order Birkhoff averages. Dyn Syst. 2009;24(3):299–313.