30 April 2002 | Acceleration of one-dimensional mixing by discontinuous mappings
| Ashwin, Peter; Nicol, Matthew; Kirkby, Norman |
19 February 2001 | Anisotropic properties of riddled basins
| Ashwin, Peter; Breakspear, Michael |
15 January 1999 | Attractors of a randomly forced electronic oscillator
| Ashwin, Peter |
30 September 2011 | Bidirectional transport and pulsing states in a multi-lane ASEP model
| Lin, Congping; Steinberg, Gero; Ashwin, Peter |
22 September 2007 | Bifurcation to heteroclinic cycles and sensitivity in three and four coupled phase oscillators
| Ashwin, Peter; Burylko, Oleksandr; Maistrenko, Yuri |
1998 | Blowout bifurcation in a system of coupled chaotic lasers
| Ashwin, Peter; Terry, John R.; Thornburg, K. Scott; et al. |
9 December 2011 | Chaos in symmetric phase oscillator networks
| Bick, Christian; Timme, Marc; Paulikat, Danilo; et al. |
29 September 2015 | Chaotic Weak Chimeras and their Persistence in Coupled Populations of Phase Oscillators
| Bick, Christian; Ashwin, Peter |
12 August 2015 | Chimera states in networks of phase oscillators: the case of two small populations
| Panaggio, Mark J.; Abrams, Daniel M.; Ashwin, Peter; et al. |
14 September 2005 | Classification of robust heteroclinic cycles for vector fields in R3 with symmetry
| Hawker, David; Ashwin, Peter |
7 September 2009 | Cone exchange transformations and boundedness of orbits
| Ashwin, Peter; Goetz, Arek |
1 June 2003 | Convergence to local random attractors
| Ashwin, Peter; Ochs, Gunter |
28 November 2011 | Criteria for robustness of heteroclinic cycles in neural microcircuits.
| Ashwin, Peter; Karabacak, Ozkan; Nowotny, Thomas |
3 December 1998 | Cycling chaos: its creation, persistence and loss of stability in a model of nonlinear magnetoconvection
| Ashwin, Peter; Rucklidge, Alastair M. |
6 August 2004 | Cycling chaotic attractors in two models for dynamics with invariant subspaces
| Ashwin, Peter; Rucklidge, Alastair M.; Sturman, Rob |
20 February 2003 | Decelerating defects and non-ergodic critical behaviour in a unidirectionally coupled map lattice
| Ashwin, Peter; Sturman, Rob |
10 June 2015 | Designing heteroclinic and excitable networks in phase space using two populations of coupled cells
| Ashwin, Peter; Postlethwaite, Claire |
1 September 2009 | Designing the dynamics of globally coupled oscillators
| Orosz, Gábor; Moehlis, Jeff; Ashwin, Peter |
15 August 2005 | Discrete computation using a perturbed heteroclinic network
| Ashwin, Peter; Borresen, Jon |
11 November 2010 | Dynamics of coupled cell networks: synchrony, heteroclinic cycles and inflation
| Aguiar, M.; Ashwin, Peter; Dias, A.; et al. |