Articles dans des revues avec comité de lecture (272)
177.
Nicolis, C., & Nicolis, G. (1985). Gibt es einen klima-attractor ? Physikalische Blätte, 41, 5.
178.
Nicolis, G., & Baras, F. (1985). Nonequilibrium dynamics in chemical systems: A brief account. Physica D: Nonlinear Phenomena, 17(3), 345-348. doi:10.1016/0167-2789(85)90218-0
179.
Nicolis, C., Boon, J.-P., & Nicolis, G. (1985). Fluctuation-dissipation theorem and intrinsic stochasticity of climate. Il Nuovo cimento C., 8(3), 223-242. doi:10.1007/BF02574709
180.
Frankowicz, M., Malek-Mansour, M.-A., & Nicolis, G. (1984). Stochastic analysis of explosive behaviour: A qualitative approach. Physica. A, 125(1), 237-246.
181.
Gaspard, P., Kapral, R., & Nicolis, G. (1984). Bifurcation phenomena near homoclinic systems: A two-parameter analysis. Journal of Statistical Physics, 35(5-6), 679-727. doi:10.1007/BF01010829
182.
Malek-Mansour, M.-A., Frankowicz, M., & Nicolis, G. (1984). Stochastic analysis of explosive behavior: a qualitative approach. Physica A: Statistical Mechanics and its Applications, 125(1), 237-246.
183.
Lemarchand, H., & Nicolis, G. (1984). Stochastic analysis of symmetry-breaking bifurcations: Master equation approach. Journal of Statistical Physics, 37(5-6), 609-629. doi:10.1007/BF01010498
184.
Nicolis, G., & Malek-Mansour, M.-A. (1984). Onset of spatial correlations in nonequilibrium systems: A master-equation description. Physical Review A, 29(5), 2845-2853. doi:10.1103/PhysRevA.29.2845
185.
Nicolis, C., & Nicolis, G. (1984). Is there a climatic attractor ? Nature (London), 311, 529-532. doi:10.1038/311529a0
186.
Jiu-Li, L., Van Den Broeck, C., & Nicolis, G. (1984). Stability criteria and fluctuations around nonequilibrium states. Zeitschrift für Physik B : Condensed Matter and Quant, 56(2), 165-170. doi:10.1007/BF01469698
187.
Gaspard, P., & Nicolis, G. (1983). What can we learn from homoclinic orbits in chaotic dynamics? Journal of Statistical Physics, 31(3), 499-518. doi:10.1007/BF01019496
188.
Frankowicz, M., & Nicolis, G. (1983). Transient evolution towards a unique stable state: Stochastic analysis of explosive behavior in a chemical system. Journal of Statistical Physics, 33(3), 595-609. doi:10.1007/BF01018836