References
- [Bunimowich 01] L. A. Bunimowich. “Mushrooms and Other Billiards with Divided Phase Space.” Chaos 11 (2001), 802–808.
- [Malovrh and Prosen 02] J. Malovrh and T. Prosen. “Spectral Statistics of a System with Sharply Divided Phase Space.” J. Phys. A: Math. Gen. 35 (2002), 2483–2490.
- [Altmann et al. 06] E. G. Altmann, A. E. Motter, and H. Kantz. “Stickiness in Hamiltonian Systems: From Sharply Divided to Hierarchical Phase Space.” Phys. Rev. E: Stat. Nonlin. Soft Matter. Phys. 73 (2006), 026207.
- [Cristadoro and Ketzmerick 08] G. Cristadoro and R. Ketzmerick. “Universality of Algebraic Decays in Hamiltonian Systems.” Phys. Rev. Lett. 100 (2008), 184101.
- [Prosen and M. Robnik 98] T. Prosen and M. Robnik. “General Poissonian Model of Diffusion in Chaotic Components.” J. Phys. A: Math. Gen. 31 (1998), L345
- [Lichtenberg and Lieberman 92] A.J. Lichtenberg and M.A. Lieberman. Regular and Chaotic Dynamics (1992).
- [Soskin and Mannella 09] S. M. Soskin and R. Mannella. “Maximal Width of the Separatrix Chaotic Layer.” Phys. Rev. E: Stat. Nonlin. Soft Matter Phys. 80 (2009), 066212.
- [Bunimowich and Del Magno 06] L.A. Bunimowich and G. Del Magno. “Semi-Focusing Billiards: Hyperbolicity.” Commun. Math. Phys. 262:1 (2006), 17–32.
- [Bunimowich and Del Magno 08] L.A. Bunimowich and G. Del Magno. “Semi-Focusing Billiards: Ergodicity.” Ergod. Theory Dyn. Syst. 28:5 (2008), 1377–1417.
- [Altmann et al. 05] E. G. Altmann, A. E. Motter, and H. Kantz. “Stickiness in Mushroom Billiards.” Chaos 15 (2005), 033105.
- [Tanaka and. Shudo 06] A. Tanaka and A. Shudo. “Recurrence Time Distribution in Mushroom Billiards with Parabolic Hat.” Phys. Rev. E 74 (2006), 036211.
- [Dietz 06] B. Dietz, T. Friedrich, M. Miski-Oglu, A. Richter, T. H. Seligman, and K. Zapfe. “Nonperiodic Echoes from Mushroom Billiard Hats.” Phys. Rev. E 74 (2006), 056207.
- [Barnett and Betcke 07] A. H. Barnett and T. Betcke. “Quantum Mushroom Billiards.” Chaos 17:4 (2007), 043125.
- [Dietz et al. 07] B. Dietz, T. Friedrich, M. Miski-Oglu, A. Richter, and F. Schäfer. “Spectral Properties of Bunimovich Mushroom Billiards.” Phys. Rev. E 75 (2007), 035203(R).
- [Vidmar et al. 07] G. Vidmar, H.-J. Stöckmann, M. Robnik, U. Kuhl, R. Höhmann, and S. Grossmann. “Beyond the Berry-Robnik Regime: A Random Matrix Study of Tunneling Effects.” J. Phys. A: Math. Theor. 40 (2007), 13883–13905.
- [Bäcker et al. 08] A. Bäcker, R. Ketzmerick, S. Löck, M. Robnik, G. Vidmar, R. Höhmann, U. Kuhl, and H.-J. Stöckmann. “Dynamical Tunneling in Mushroom Billiards.” Phys. Rev. Lett. 100 (2008), 174103.
- [Heller and Tomsovic 93] E. J. Heller and S. Tomsovic. “Postmodern Quantum Mechanics.” Phys. Today 46 (1993), 38–46.
- [Lopac et al. 99] V. Lopac, I. Mrkonjic, and D. Radic. “Classical and Quantum Chaos in the Generaliyed Parabolic Lemon-Shaped Billiard.” Phys. Rev. E 59 (1999), 303–311.
- [Lopac et al. 01] V. Lopac, I. Mrkonjic, and D. Radic. “Chaotic Behaviour in Lemon-Shaped Billiards with Elliptical and Hyperbolic Boundary Arcs.” Phys. Rev. E 64 (2001), 016214.
- [Makino et al. 01] H. Makino, T. Harazama, and Y. Aizawa. “Quantum-Classical Correspondence of the Berry-Robnik Parameter Through Bifurcations in Lemon Billiard Systems.” Phys. Rev. E 63 (2001), 056203.
- [Chen et al. 13] J. Chen, L. Mohr, H.-K. Zhang, and P. Zhang. “Ergodicity of the Generalized Lemon Billiards.” Chaos 23 (2013), 043137.
- [Bunimowich et al. 15] L. A. Bunimowich, H.-K. Zhang and P. Zhang. “On Another Edge of Defocusing: Hyperbolicity of Asymmetric Lemon Billiards.” Commun. Math. Phys. 341 (2015), 3781–3803.
- [Contopoulos 71] G. Contopoulos. “Orbits in Highly Perturbed Dynamical System. III. Nonperiodic Orbits.” Astron. J. 76 (1971), 147–156.
- [Dettmann and Georgiou 11] C.P. Dettmann and O. Georgiou. “Open Mushrooms: Stickiness Revisited.” J. Phys. A: Math. Theor. 44 (2011), 195102.
- [Bunimowich 14] L.A. Bunimowich. “Fine Structure of Sticky Sets in Mushroom Billiards.” J. Stat. Phys. 154:1 (2014), 421–431.