2. Stable two-dimensional parametric solitons in hydrodynamic models, G.A. Gottwald, R.H.J. Grimshaw and B. Malomed, Phys. Lett. A 248 (1998), 208-218.
3. The formation of coherent structures in the context of blocking, G.A. Gottwald and R.H.J. Grimshaw, J. Atmos. Sci. 56 (1999), 3640-3662.
4. The effect of topography on the dynamics of interacting solitary waves as an example for atmospheric blocking, G.A. Gottwald and R.H.J. Grimshaw, J. Atmos. Sci. 56 (1999), 3663-3678.
5. Persistence of zero velocity fronts in reaction diffusion systems, G.A. Gottwald, L. Kramer, V. Krinsky, A. Pumir and V. Barelko, Chaos 10 (2000), 731-737.
6. Spiral wave drift induced by stimulating wave trains, G.A. Gottwald, A. Pumir and V. Krinsky, Chaos 11 (2001), 487-494.
7. An integrable shallow water system with linear and nonlinear dispersion, H.R. Dullin, G.A. Gottwald and D.D. Holm, Phys. Rev. Lett. 87 (2001), 194501-4504.
8. A numerical framework for computing spectra of the linearization about solitary waves and fronts, T. Bridges, G. Derks, G.A. Gottwald, Physica D 172 (2002), 190-216.
9. On the nature of Benford's Law, G.A. Gottwald and M. Nicol, Physica A 303 (2002), 387-396.
10. Singular and regular gap solitons between three dispersion curves, R.H.J. Grimshaw, B. Malomed and G.A. Gottwald, Phys. Rev. E 65 (2002), 066606-620.
11. A Hamiltonian particle-mesh method for the rotating shallow-water equations, J. Frank, G.A. Gottwald and S.Reich, Meshless Methods for Partial Differential Equations, Springer Lecture Notes in Computational Science and Engineering 26 (2002), 131-142 .
12. Camassa-Holm, Korteweg-de Vries-5 and other asymptotically equivalent equations for shallow water waves, H.R. Dullin, G.A. Gottwald and D.D. Holm, Fluid Dynamics Research 33 (2003), 73-95.
13. A new test for chaos in deterministic systems, G.A. Gottwald and I. Melbourne, Proc. Roy. Soc. Lond. A 460 (2004), 603-611.
14. Propagation failure in one- and two-dimensional excitable media, G.A. Gottwald and L. Kramer, Chaos 14 (2004), 855-863. Also selected for the October 1, 2004 issue of Virtual Journal of Biological Physics Research
15. On asymptotically equivalent shallow water wave equations, H.R. Dullin, G.A. Gottwald and D.D. Holm, Physica D 190 (2004), 1-14.
16. A robust numerical method to study oscillatory instability of gap solitary waves, G. Derks and G.A. Gottwald, SIAM Journal on Applied Dynamical Systems 4 (2005), 150-158.
17. Testing for chaos in deterministic systems with noise, G.A. Gottwald and I. Melbourne, Physica D 212 (2005), 100-110.
18. On bifurcations in reaction-diffusion systems in chaotic flows, S. Menon and G.A. Gottwald, Phys. Rev. E 71 (2005), 066201.
19. The Zakharov-Kuznetsov equation as a two-dimensional model for nonlinear Rossby waves, G.A. Gottwald, (2004)
20. On multiscale entropy analysis for physiological data, R.A. Thuraisingham and G.A. Gottwald, Physica A 366 (2006), 323-332.
21. A bistable reaction--diffusion system in a stretching flow, S.M. Cox and G.A. Gottwald, Physica D 216 (2006), 307-318.
22. A normalform for excitable media, G.A. Gottwald and L. Kramer, Chaos 16 (2006), 013122.
23. Application of the 0-1 test for chaos to experimental data, I. Falconer, G.A. Gottwald, I. Melbourne and K. Wormnes, SIAM Journal on Applied Dynamical Systems 6 (2007), 395-402.
24. Slow dynamics via degenerate variational asymptotics, G.A. Gottwald and M. Oliver, submitted (2006)
25. Long-time accuracy for approximate slow manifolds in a finite dimensional model of balance, G.A. Gottwald, M. Oliver and N. Tecu, Journal of Nonlinear Science 17 (2007), 383-307.
26. High Lewis number combustion wavefronts: A perturbative Melnikov analysis, S. Balasuriya, G.A. Gottwald, J. Hornibrook and S. Lafortune, SIAM J. Applied Math. 67 (2007), 464-486.
27. Bifurcations of flame filaments in chaotically mixed combustion reactions, S. Menon and G.A. Gottwald, Phys. Rev. E 75 (2007), 016209.
28. Dispersive regularizations and numerical discretizations for the inviscid Burgers equation, G.A. Gottwald, J. Phys. A 40 (2007), 14745-14758.
29. Power Spectra for deterministic chaotic dynamical systems, I. Melbourne and G.A. Gottwald, Nonlinearity 21 (2008), 179-189.
30. Comment on "Reliability of the 0-1 test for chaos", G.A. Gottwald and I. Melbourne, Phys. Rev. E 77 (2008), 028201.
31. Bifurcation analysis of a normal form for excitable media: Are stable dynamical alternans on a ring possible?, G.A. Gottwald, Chaos 18 (2008), 013129. Also selected for the April 1, 2008 issue of Virtual Journal of Biological Physics Research
32. A unifying theory for vortex dynamics in two-dimensional turbulence, D.G. Dritschel, R.K. Scott, C. Macaskill, G.A. Gottwald and C.V. Tran, Phys. Rev. Lett. 101 (2008), 094501. This paper was chosen as an Editor's Suggestion.
33. On the implementation of the 0-1 test for chaos, G.A. Gottwald and I. Melbourne, SIAM Journal on Applied Dynamical Systems 8 (2009), 129-145.
34. On bifurcations in a chaotically stirred excitable medium, S. Menon and G.A. Gottwald, Physica D 238 (2009), 461-475.
35. Boltzmann's dilemma -- an introduction to statistical mechanics via the Kac ring, G.A. Gottwald and M. Oliver, SIAM Review 51 (2009), 613-635.
36. On the validity of the 0-1 test for chaos, G.A. Gottwald and I. Melbourne, Nonlinearity 22 (2009), 1367-1382.
37. Ensemble propagation and continuous matrix factorization algorithms, K. Bergemann, G.A. Gottwald and S. Reich, Q.J.R. Meteorolog. Soc. 135 (2009), 1560-1572.
38. Vortex self-similarity in unforced inviscid two-dimensional turbulence, D.G. Dritschel, R.K. Scott, C. Macaskill, G.A. Gottwald and C.V. Tran, Journal Fluid Mech. 640 (2009), 217-235.
39. Wavespeed in reaction-diffusion systems, with applications to chemotaxis and population pressure, S. Balasuriya and G.A. Gottwald, J. Math. Biolog. 61 (2010), 377-399.
40. The large core limit of spiral waves in excitable media: A numerical approach, S. Hermann and G.A. Gottwald, SIAM Journal on Applied Dynamical Systems 9 (2010), 536-567.
41. Controlling overestimation of error covariance in ensemble Kalman filters with sparse observations: A variance limiting Kalman filter, G.A. Gottwald, L. Mitchell and S. Reich, Monthly Weather Review 139 (2011), 2650-2667.
42. On the topology of synchrony optimized networks of a Kuramoto-model with non-identical oscillators, D. Kelly and G.A. Gottwald, Chaos 21 (2011), 025110.
43. The Langevin equation limit of the Nosé-Hoover-Langevin thermostat, J. Frank and G.A. Gottwald, J. Stat. Phys. 143 (2011), 715-724.
44. Data assimilation in slow-fast systems using homogenized climate models, L. Mitchell and G.A. Gottwald, J. Atmos. Sci. 69 (2012), 1359-1377.
45. On finite size Lyapunov exponents in multiscale systems with slow and fast metastable states, L. Mitchell and G.A. Gottwald, Chaos 22 (2012), 023115.
46. Controlling model error of underdamped forecast models in sparse observational networks using a variance limiting Kalman filter, L. Mitchell and G.A. Gottwald, accepted for publication in Q.J.R. Meteorolog. Soc. (2012).
47. Diffusion and anomalous diffusion in spatially extended systems: A Huygens principle for superdiffusion, G.A. Gottwald and I. Melbourne, submitted (2011).
P2. Models for instability in geophysical flows, R.H.J. Grimshaw and G.A. Gottwald, In: Proceedings of IUTAM Symposium on Advances in Mathematical Modelling of Atmosphere and Ocean Dynamics Kluwer Academic Publishers (2001), 153-161, edited by P.F. Hodnett.
P3. Cuspons and peakons vis-a-vis regular solitons and collapse in a three-wave system, R.H.J. Grimshaw, B. Malomed and G.A. Gottwald, Proceedings of the AMS-IMS-SIAM Conference "The Legacy of Inverse Scattering Theory in Nonlinear Wave Propagation CONM (Contemporary Math) AMS series (2002), edited by J. Bona, R. Choudhury and D. Kaup.
P4. On a normalform for excitable media, G.A. Gottwald and L. Kramer, Oberwolfach Reports, Volume 2, Issue 2, (2005), 1941-1942.
P5. On recent trends in climate dynamics, G.A. Gottwald, AMS Gazette 37, Number 5, (2010), 319-326.