References

[1]: M. Hénon. A two-dimensional mapping with a strange attractor. Communications in Mathematical Physics 50, 69–77 (1976).
[2]: M. Benedicks and L. Carleson. The Dynamics of the Henon Map. Annals of Mathematics 133, 73–169 (1991). Accessed on Oct 7, 2023.
[3]: P. Zgliczynski. Computer assisted proof of chaos in the Rössler equations and in the Hénon map. Nonlinearity 10, 243 (1997).
[4]: M. Dellnitz and A. Hohmann. A Subdivision Algorithm for the Computation of Unstable Manifolds and Global Attractors. Numerische Mathematik (1997).
[5]: A. Lasota and M. C. Mackey. Chaos, Fractals, and Noise (Springer Science+Business Media New York 1994, 1994).
[6]: M. Dellnitz, G. Froyland and O. Junge. The Algorithms Behind GAIO - Set Oriented Numerical Methods for Dynamical Systems. Ergodic Theory, Analysis, and Efficient Simulation of Dynamical Systems (2000).
[7]: O. Junge. Rigorous discretization of subdivision techniques. Equadiff 99 (2000).
[8]: M. Dellnitz and A. Hohmann. The Computation of Unstable Manifolds Using Subdivision and Continuation. Nonlinear Dynamical Systems and Chaos (1996).
[9]: O. Junge, D. Matthes and B. Schmitzer. Entropic transfer operators (2023), arXiv:2204.04901 [math.DS].
[10]: G. Froyland and K. Padberg-Gehle. Almost-Invariant and Finite-Time Coherent Sets: Directionality, Duration, and Diffusion. In: Ergodic Theory, Open Dynamics, and Coherent Structures, edited by W. Bahsoun, C. Bose and G. Froyland (Springer New York, New York, NY, 2014); pp. 171–216.
[11]: M. Dellnitz and O. Junge. On the Approximation of Complicated Dynamical Behavior. SIAM Journal on Numerical Analysis 36, 491–515 (1999), arXiv:https://doi.org/10.1137/S0036142996313002.
[12]: G. Froyland, C. P. Rock and K. Sakellariou. Sparse eigenbasis approximation: Multiple feature extraction across spatiotemporal scales with application to coherent set identification. Communications in Nonlinear Science and Numerical Simulation 77 (2019).
[13]: Z. Hu, G. Pan, Y. Wang and Z. Wu. Sparse Principal Component Analysis via Rotation and Truncation (2014), arXiv:1403.1430.
[14]: D. A. Russell, J. D. Hanson and E. Ott. Dimension of Strange Attractors. Phys. Rev. Lett. 45, 1175–1178 (1980).
[15]: W.-J. Beyn and A. Lust. A hybrid method for computing Lyapunov exponents. Numerische Mathematik 113, 357–375 (2009).
[16]: C. Conley. Isolated Invariant Sets and the Morse Index. Vol. 38 (American Mathematical Society, 1978).
[17]: T. Kaczynski, K. Mischaikow and M. Mrozek. Computational Homology (Springer New York, 2004).
[18]: A. Herwig. GAIO.jl: Set-oriented Methods for Approximating Invariant Objects, and their Implementation in Julia. Thesis.
[19]: Razvan. On Conley's fundamental theorem of dynamical systems. International Journal of Mathematics and Mathematical Sciences 2004 (2004).