Abstract
Finally, we briefly mention a few selected topics on GSPT that have not been covered in this manuscript. This list of topics is non-inclusive—it is an author’s choice (like all topics covered in this manuscript).
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References
D. Avitabile, M. Desroches, E. Knobloch, Spatiotemporal canards in neural field equations. Phys. Rev. E 95(4), 042205 (2017)
D. Avitabile, M. Desroches, E. Knobloch, M. Krupa, Ducks in space: from nonlinear absolute instability to noise-sustained structures in a pattern-forming system, in Proceedings of the Royal Society of London A: Mathematical, Physical and Engineering Sciences, vol. 473 (2017), p. 20170018
P. Bates, K. Lu, C. Zeng, Existence and persistence of invariant manifolds for semiflows in banach space. Mem. Am. Math. Soc. 645 (1998)
E. Benoit (ed.), Dynamic Bifurcations. Lecture Notes in Mathematics, vol. 1493 (Springer, Berlin, 1991)
M. Bernardo, C. Budd, A. Champneys, P. Kowalczyk, Piecewise-smooth dynamical systems: theory and applications, in Applied Mathmematical Sciences (Springer, London, 2008)
E. Bossolini, M. Brøns, K. Kristiansen, Canards in stiction: on solutions of a friction oscillator by regularization. SIAM J. Appl. Dyn. Syst. 16(4), 2233–2256 (2017)
P. Cardin, P. da Silva, M. Teixeira, On singularly perturbed Filippov systems. Eur. J. Appl. Math. 24, 835–856 (2013)
P. Cardin, M. Teixeira, Fenichel theory for multiple time scale singular perturbation problems. SIAM J. Appl. Dyn. Syst. 16, 1425–1452 (2017)
M. Desroches, V. Kirk, Spike-adding in a canonical three time scale model: superslow explosion and folded-saddle canards. SIAM J. Appl. Dyn. Syst. 17, 1989–2017 (2018)
M. Desroches, J. Guckenheimer, B. Krauskopf, C. Kuehn, H. Osinga, M. Wechselberger, Mixed-mode oscillations with multiple time scales. SIAM Rev. 54(2), 211–288 (2012)
A. Filippov, Differential equations with discontinuous righthand sides, in Mathematics and its Applications (Kluwer, Dordrecht, 1988)
A. Goeke, S. Walcher, Quasi steady-state: searching for and utilizing small parameters, in Springer Proceedings in Mathematics and Statistics of Recent Trends in Dynamical Systems, vol. 35 (eds.) by A. Johann et al. (Springer, Berlin, 2013), pp. 153–178
A. Goeke, S. Walcher, E. Zerz, Determining ‘small parameters’ for quasi-steady state. J. Differ. Equ. 259, 1149–1180 (2015)
M. Hayes, T. Kaper, P. Szmolyan, M. Wechselberger, Geometric desingularization of degenerate singularities in the presence of rotation: a new proof of known results for slow passage through Hopf bifurcation. Indag. Math. 27, 1184–1203 (2016)
N. Hinrichs, M. Oestreich, K. Popp, On the modelling of friction oscillators. J. Sound Vib. 216, 435–459 (1998)
T. Kaper, T. Vo, Delayed loss of stability due to the slow passage through Hopf bifurcation in reaction–diffusion equations. Chaos 28, 091103 (2018)
H. Kaper, T. Kaper, A. Zagaris, Geometry of the computational singular perturbation method. Math. Model. Nat. Phenom. 10(3), 16–30 (2015)
I. Kosiuk, P. Szmolyan, Scaling in singular perturbation problems: blowing up a relaxation oscillator. SIAM J. Appl. Dyn. Syst. 10(4), 1307–1343 (2011)
K. Kristiansen, S. Hogan, On the use of blowup to study regularizations of singularities of piecewise smooth dynamical systems in \(\mathbb {R}^3\). SIAM J. Appl. Dyn. Syst. 14, 382–422 (2015)
M. Krupa, N. Popović, N. Kopell, Mixed-mode oscillations in three time-scale systems: a prototypical example. SIAM J. Appl. Dyn. Syst. 7(2), 361–420 (2008)
C. Kuehn, Multiple Time Scale Dynamical Systems (Springer, Berlin, 2015)
S. Lam, D. Goussis, Understanding complex chemical kinetics with computational singular perturbation, in Proceedings of the Twenty-Second Symposium (International) on Combustion, pp. 931–941 (1988)
B. Letson, J. Rubin, T. Vo, Analysis of interacting local oscillation mechanisms in three-timescale systems. SIAM J. Appl. Math. 77, 1020–1046 (2017)
I. Lizarraga, M. Wechselberger, Computational singular perturbation method for nonstandard slow-fast systems (2019). arXiv:1906.06049
U. Maas, S. Pope, Simplifying chemical kinetics: intrinsic low-dimensional manifolds in composition space. Combust. Flame 88, 239–264 (1992)
K. Mease, Geometry of computational singular perturbations, in IFAC Proceedings, vol. 28 (1995), pp. 855–861
G. Menon, G. Haller, Infinite dimensional geometric singular perturbation theory for the Maxwell–Bloch equations. SIAM J. Math. Anal. 33, 315–346 (2001)
P. Nan, Y. Wang, V. Kirk, J. Rubin, Understanding and distinguishing three time scale oscillations: case study in a coupled Morris-Lecar system. SIAM J. Appl. Dyn. Syst. 14, 1518–1557 (2015)
A.I. Neishtadt, Persistence of stability loss for dynamical bifurcations. Differ.Uravn. 23(12), 2060–2067 (1987)
E. Pennestrì, V. Rossi, P. Salvini, P. Valentini, Review and comparison of dry friction force models. Nonlinear Dyn. 83(4), 1785–1801 (2016)
M. Roussel, S. Fraser, Invariant manifold methods for metabolic model reduction. Chaos 11, 196–206 (2001)
M.A. Shishkova, Study of a system of differential equations with a small parameter at the highest derivatives. Dokl. Akad. Nauk. SSSR 209, 576–579 (1973)
T. Vo, R. Bertram, M. Wechselberger, Multiple geometric viewpoints of mixed mode dynamics associated with pseudoplateau bursting. SIAM J. Appl. Dyn. Syst. 12(2), 789–830 (2013)
A. Zagaris, H. Kaper, T. Kaper, Two perspectives on reduction of ordinary differential equations. Math. Nachr. 278, 1629–1642 (2005)
A. Zagaris, C. Vanderkerckhove, W. Gear, T. Kaper, I. Kevrekidis, Stability and stabilization of the constrained run schemes for equation-free projection to a slow manifold. DCDS-A 32(8), 2759–2803 (2012)
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Wechselberger, M. (2020). What We Did Not Discuss. In: Geometric Singular Perturbation Theory Beyond the Standard Form. Frontiers in Applied Dynamical Systems: Reviews and Tutorials, vol 6. Springer, Cham. https://doi.org/10.1007/978-3-030-36399-4_7
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