Richardson Michael J, Schmidt R C, Kay Bruce A
Department of Psychology, Colby College, 5550 Mayflower Hill, Waterville, ME 04901, USA.
Biol Cybern. 2007 Jan;96(1):59-78. doi: 10.1007/s00422-006-0104-6. Epub 2006 Sep 5.
The variability of coupled rhythmic limb movements is assumed to be a consequence of the strength of a movement's attractor dynamic and a constant stochastic noise process that continuously perturbs the movement system away from this dynamic. Recently, it has been suggested that the nonlinear technique of recurrence analysis can be used to index the effects of noise and attractor strength on movement variability. To test this, three experiments were conducted in which the attractor strength of bimanual wrist-pendulum movements (using coordination mode, movement frequency and detuning), as well as the magnitude of stochastic perturbations affecting the variability of these movements (using a temporally fluctuating visual metronome) was manipulated. The results of these experiments demonstrate that recurrence analysis can index parametric changes in the attractor strength of coupled rhythmic limb movements and the magnitude of metronome induced stochastic perturbations independently. The results of Experiments 1 and 2 also support the claim that differences between the variability of inphase and antiphase coordination, and between slow and fast movement frequencies are due to differences in attractor strength. In contrast to the standard assumption that the noise that characterizes interlimb coordination remains constant for different magnitudes of detuning (Delta omega) the results of Experiment 3 suggest that the magnitude of noise increases with increases in |Delta omega|.
耦合节律性肢体运动的变异性被认为是运动吸引子动力学强度和一个持续扰动运动系统使其偏离该动力学的恒定随机噪声过程的结果。最近,有人提出递归分析这种非线性技术可用于衡量噪声和吸引子强度对运动变异性的影响。为了验证这一点,进行了三个实验,其中对双手腕摆运动的吸引子强度(使用协调模式、运动频率和失谐)以及影响这些运动变异性的随机扰动幅度(使用随时间波动的视觉节拍器)进行了操控。这些实验结果表明,递归分析能够独立地衡量耦合节律性肢体运动吸引子强度的参数变化以及节拍器引起的随机扰动幅度。实验1和2的结果也支持了这样的观点,即同相和反相协调变异性之间以及慢速和快速运动频率之间的差异是由于吸引子强度的差异所致。与标准假设不同,即对于不同失谐幅度(Δω),表征肢体间协调的噪声保持恒定,实验3的结果表明,噪声幅度随|Δω|的增加而增加。