Parties d'ouvrages collectifs (31)
  1. 4. Prigogine, I., Nicolis, G., & Allen, P. (2006). Eyring'S Theory of Viscosity of Dense Media and Nonequilibrium Statistical Mechanics. In Chemical Dynamics: Papers in Honor of Henry Eyring (pp. 473-479). New-York-Chichester: John Wiley and Sons Ltd.(Advances in Chemical Physics). doi:10.1002/9780470143698.ch30
  2. 5. Nicolis, G., & Nicolis, C. (2000). Nonequilibrium thermodynamics and dynamical complexity. In J. A. Freund & T. Pöschel (Eds.), Stochastic processes in physics, chemistry and biology (pp. 212-231). Berlin: Springer-Verlag.(Lecture Notes in Physics, 557).
  3. 6. Nicolis, C., Nicolis, G., Balakrishnan, V., & Theunissen, M. (1997). Recurrence time statistics in low-dimensional dynamical systems. In L. Schimansky-Geier & T. Pöschel (Eds.), Stochastic Dynamics (pp. 42-54). Berlin: Springer-Verlag.(Lecture Notes in Physics, 484).
  4. 7. Nicolis, G., Baras, F., Geysermans, P., & Peeters, P. (1995). Probabilistic approach to chemical instabilities and chaos. In R. Kapral (Ed.), Chemical waves and patterns (pp. 573-608). Dordrecht, The Netherlands: Kluwer academic publishers.(Understanding chemical reactivity, 10).
  5. 8. Nicolis, G. (1995). Introduction to the physics of complex systems. In S. Ciliberto, T. Dauxois, & M. Droz (Eds.), Physics of complexity (pp. 1-18). Gif-sur-Yvette, France: Editions Frontières.
  6. 9. Nicolis, C., & Nicolis, G. (1995). Chaos in dissipative systems: understanding atmospheric physics. In I. Prigogine & S. A. Rice (Eds.), Advances in Chemical Physics (pp. 511-570). New-York-Chichester: J. Wiley & Sons.
  7. 10. Nicolis, G. (1992). Dynamical systems, instability of motion and information processing. In K. Haefner (Ed.), Evolution of information processing systems:: an interdisciplinary approach for a new understanding of nature and society. Berlin: Springer.
  8. 11. Nicolis, G., Piasecki, J., & Mc Kernan, D. (1992). Toward a probabilistic description of deterministic chaos. In G. Györgyi, I. Kondor, L. Sasvari, & T. Tél (Eds.), From phase transitions to chaos.: topics in modern statistical physics (p. 349). Singapore, New Jersey: World scientific.
  9. 12. Kitahara, K., Miyazaki, K., Malek-Mansour, M.-A., & Nicolis, G. (1991). Fokker-Planck Equation for Hydrodynamic Fluctuations. In T. Musha, S. Sato, & M. Yamammoto (Eds.), Noise in Physical Systems. Ohmsha.
  10. 13. Nicolis, G., & Nicolis, C. (1991). Nonlinear dynamic systems in geosciences. In E. Franseen, W. Watney, C. Kendall, & W. Ross (Eds.), Sedimentary modeling:: computer simulations and methods for improved parameter definition.(Bulletin, Kansas geological survey, 233).
  11. 14. Baras, F., & Nicolis, G. (1990). Microscopic simulations of exothermic chemical systems. In M. Mareschal (Ed.), Microscopic simulation of complex flow. New York: Plenum.
  12. 15. Baras, F., Nicolis, G., & Peeters, P. (1990). Toward a fluctuation chemistry. In P. Gray, G. Nicolis, F. Baras, P. Borckmans, & S. Scott (Eds.), Spatial inhomogeneities and transient behavior in chemical kinetics (pp. 507-524). Manchester, U.K.: Manchester University press.
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