References
- Balasubramaniam, R., Wing, A. M., & Daffertshofer, A. (2004). Keeping with the beat: Movement trajectories contribute to movement timing. Experimental Brain Research, 159, 129-134.
- Beek, P. J. (1989). Juggling dynamics. Published doctoral dissertation. Amsterdam: Free University Press.
- Beek, P. J., & Beek, W. J. (1988). Tools for constructing dynamical models of rhythmic movement. Human Movement Science, 7, 301-342.
- Beek, P. J., Rikkert, W. E. I., & van Wieringen, P. C. W. (1996). Limit cycle properties of rhythmic forearm movements. Journal of Experimental Psychology: Human Perception and Performance, 22, 1077-1093.
- Beek, P. J., Schmidt, R. C., Morris, A. W., Sim, M.-Y., & Turvey, M. T. (1995). Linear and nonlinear stiffness and friction in biological rhythmic movements. Biological Cybernetics, 73, 499-507.
- Bootsma, R. J., Mottet, D., & Zaal, F. T. J. M. (1998). Trajectory formation and speed-accuracy trade-off in aiming movements. Life Sciences, 321, 377-383.
- Byblow, W. D., Carson, R. G., & Goodman, D. (1994). Expressions of asymmetries and anchoring in bimanual coordination. Human Movement Science, 13, 3-28.
- Collins, D. R., Park, H., & Turvey, M. T. (1998). Relative coordination reconsidered: A stochastic account. Motor Control, 2, 228-240.
- Friedrich, R., & Peinke, J. (1997) Description of a turbulent cascade by a Fokker-Planck equation. Physical Review Letters, 78, 863-866.
- Friedrich, R., Peinke, J., & Renner, C. (1997). How to quantify deterministic and random influences on the statistics of the foreign exchange market. Physical Review Letters, 84, 5224-5227.
- Gradišek, J., Govekar, E., & Grabec, I. (2002). Qualitative and quantitative analysis of stochastic processes based on measured data: II. Applications to experimental data. Journal of Sound and Vibration, 252, 563-572.
- Haken, H., Kelso, J. A. S., & Bunz, H. A. (1985). Theoretical model of phase transitions in human hand movements. Biological Cybernetics, 51, 347-356.
- Jirsa, V., & Kelso, J. A. S. (2004). The excitator as a minimal model for the coordination dynamics of discrete and rhythmic movement generation. Journal of Motor Behavior, 37, 35-51.
- Kay, B. A., Kelso, J. A. S., & Saltzman, E. L. (1991). Steady-state and perturbed rhythmic movements: A dynamical analysis. Journal of Experimental Psychology: Human Perception and Performance, 17, 183-197.
- Kay, B. A., Kelso, J. A. S., Saltzman, E. L., & Schöner, G. (1987). The space-time behavior of single and bimanual rhythmical movements: Data and model. Journal of Experimental Psychology: Human Perception and Performance, 13, 178-192.
- Kelso, J. A. S., Holt, K. G., Kugler, P. N., & Turvey, M. T. (1980). Coordinative structures as dissipative structures: II. Empirical lines of convergence. In G. E. Stelmach & J. Requin (Eds.), Tutorials in motor behavior (pp. 49-70). Amsterdam: North Holland.
- Kelso, J. A. S., Holt, K. G., Rubin, P., & Kugler, P. N. (1981). Patterns of human interlimb coordination emerge from the properties of nonlinear, limit-cycle oscillatory processes: Theory and data. Journal of Motor Behavior, 13, 226-261.
- Kriso, S., Peinke, J., Friedrich, R., & Wagner, P. (2002). Reconstruction of dynamical equations of traffic flow. Physics Letters A, 299, 287-291.
- Kugler, P. N., Kelso, J. A. S., & Turvey, M. T. (1980). On the concept of coordinative structures as dissipative structures: I. Theoretical lines of convergence. In G. E. Stelmach & J. Requin (Eds.), Tutorials in motor behavior (pp. 3-47). Amsterdam: North Holland.
- Latash, M. L., Scholz, J. F., Danion, F., & Schöner, G. (2002). Finger coordination during discrete and oscillatory force production tasks. Experimental Brain Research, 146, 419-432.
- Mottet, D., & Bootsma R. J. (1999). The dynamics of goal-directed cyclical aiming. Biological Cybernetics, 80, 235-245.
- Mottet, D., & Bootsma, R. J. (2001). The dynamics of rhythmical aiming in 2D task space: Relation between geometry and kinematics under examination. Human Movement Science, 20, 213-241.
- Mottet, D., Guiard, Y., Ferrand, T., & Bootsma, R. J. (2001). Twohanded performance of a rhythmical Fitts task by individuals and dyads. Journal of Experimental Psychology: Human Perception and Performance, 27, 1275-1286.
- Newell, K. M., Slobounov, S. M., Slobounova, E. S., & Molenaar, P. C. (1997). Stochastic processes in postural center-of-pressure profiles. Experimental Brain Research, 113, 158-164.
- Repp, B. H. (2001). Phase correction, phase resetting and phase shifts after subliminal timing perturbations in sensorimotor synchronization. Journal of Experimental Psychology: Human Perception and Performance, 27, 600-621.
- Riley, M. A., & Turvey, M. T. (2002). Variability and determinism in motor behavior. Journal of Motor Behavior, 34, 99-125.
- Schöner, G. (1990). A dynamic theory of coordination of discrete movement. Biological Cybernetics, 63, 257-270.
- Sura, P. (2003). Stochastic analysis of southern and pacific ocean sea surface winds. Journal of Atmospherical Sciences, 60, 654-666.
- van Mourik, A. M., Daffertshofer, A., & Beek, P. J. (2006a). Estimating Kramers-Moyal coefficients in short and non-stationary data sets. Physics Letters A, 351, 13-17.
- van Mourik, A. M., Daffertshofer, A., & Beek, P. J. (2006b). Deterministic and stochastic features of rhythmic human movement. Biological Cybernetics, 94, 233-244.
- Waechter, W., Riess, F., Kantz, H., & Peinke, J. (2003). Stochastic analysis of surface roughness. Europhysics Letters, 64, 579-585.
- Zaal, F. T. J. M., Bootsma, R. J., & van Wieringen, P. C. W. (1999). Dynamics of reaching for stationary and moving targets: Data and model. Journal of Experimental Psychology: Human Perception and Performance, 25, 149-161.