Space–time behavior of single and bimanual rhythmical movements: Data and limit cycle model.

Kay, Bruce A.; Kelso, J. A. Scott; Saltzman, Elliot; Schöner, Gregor

doi:10.1037/0096-1523.13.2.178

Cited by 330 publications

(295 citation statements)

References 53 publications

(117 reference statements)

Supporting

Mentioning

266

Contrasting

Unclassified

Order By: Relevance

“…(9) was fitted to the three types of data shown in Fig. 6a; here, x refers to the recorded position and y to the corresponding velocity (11) Figure 6b shows that this model fitting yields phase portraits that are very similar to the reconstructed ones in the case of forearm and wrist cycling (left and middle panels), supporting earlier studies of Kay et al (1987Kay et al ( , 1991 and Beek et al (1996). For the tapping data, however, the results turn out to be quite poor because we ignored most prominent features like asymmetry and anchoring in constructing the model according to Eq.…”

Section: Analytical Estimatessupporting

confidence: 79%

“…Using averaging methods from the theory of nonlinear oscillators, such as the slowly-varying amplitude approximation and harmonic balance analysis, Kay et al (1987Kay et al ( , 1991 derived second-order nonlinear differential equations that mimicked experimentally observed amplitude-frequency relation and the phase response characteristics of rhythmic finger and wrist movements. In particular, these selfsustaining oscillators included weak dissipative nonlinearities that stabilized the limit cycle and caused a drop of amplitude (accounted for by a Rayleigh term) and an increase in peak velocity (accounted for by a van der Pol term) with increasing movement tempo (i.e., frequency).…”

Section: Introductionmentioning

confidence: 99%

See 1 more Smart Citation

Deterministic and stochastic features of rhythmic human movement

2005

View full text Add to dashboard Cite

The dynamics of rhythmic movement has both deterministic and stochastic features. We advocate a recently established analysis method that allows for an unbiased identification of both types of system components. The deterministic components are revealed in terms of drift coefficients and vector fields, while the stochastic components are assessed in terms of diffusion coefficients and ellipse fields. The general principles of the procedure and its application are explained and illustrated using simulated data from known dynamical systems. Subsequently, we exemplify the method's merits in extracting deterministic and stochastic aspects of various instances of rhythmic movement, including tapping, wrist cycling and forearm oscillations. In particular, it is shown how the extracted numerical forms can be analysed to gain insight into the dependence of dynamical properties on experimental conditions.

show abstract

Section: Analytical Estimatessupporting

confidence: 79%

Section: Introductionmentioning

confidence: 99%

Deterministic and stochastic features of rhythmic human movement

2005

View full text Add to dashboard Cite

show abstract

“…Fundamental research work on fitting nonlinear dynamic models to trajectories of human rhythmic movements is conducted by Kay et al [1987]. Observed functional relationships between the external driving frequency and the amplitudes and peak velocities of the movements are found to be reproduced well by a mixture of van der Pol and Rayleigh oscillators with stable parameter fits.…”

Section: Modeling Rhythmic Movement Coordinationmentioning

confidence: 94%

Modeling inter-human movement coordination: synchronization governs joint task dynamics

et al. 2012

View full text Add to dashboard Cite

Human interaction partners tend to synchronize their movements during repetitive actions such as walking. Research of inter-human coordination in purely rhythmic action tasks reveals that the observed patterns of interaction are dominated by synchronization effects. Initiated by our finding that human dyads synchronize their arm movements even in a goal-directed action task, we present a step-wise approach to a model of inter-human movement coordination. In an experiment, the hand trajectories of ten human dyads are recorded. Governed by a dynamical process of phase synchronization, the participants establish in-phase as well as anti-phase relations. The emerging relations are successfully reproduced by the attractor dynamics of coupled phase oscillators inspired by the Kuramoto model. Three different methods on transforming the motion trajectories into instantaneous phases are investigated and their influence on the model fit to the experimental data is evaluated. System identification technique allows us to estimate the model parameters, which are the coupling strength and the frequency detuning among the dyad. The stability properties of the identified model match the relations observed in the experimental data. In short, our model predicts the dynamics of inter-human movement coordination. It can directly be implemented to enrich human-robot interaction.

show abstract

“…e.g. (Kay, Kelso, Saltzman, & G., 1987;Righetti & Ijspeert, 2006a)) Most of the time oscillators are used for their synchronization properties. Thus, we are interested in how the phase φ behaves over time.…”

Section: Adaptation: Lasting Changes To the Dynamicsmentioning

confidence: 99%

Engineering entrainment and adaptation in limit cycle systems

2006

View full text Add to dashboard Cite

Periodic behavior is key to life, and is observed in multiple instances and at multiple time scales in our metabolism, our natural environment, and our engineered environment. A natural way of modelling or generating periodic behavior is done by using oscillators, i.e. dynamical systems that exhibit limit cycle behavior. While there is extensive literature on methods to analyze such dynamical systems, much less work has been done on methods to synthesize an oscillator to exhibit some specific desired characteristics. The goal of this article is two-fold: (1) to provide a framework for characterizing and designing oscillators, and (2) to review how classes of well known oscillators can be understood and related to this framework.The basis of the framework is to characterize oscillators in terms of their fundamental temporal and spatial behavior, and in terms of properties that these two behaviors can be designed to exhibit. This focus on fundamental properties is important because it allows us to systematically compare a large variety of oscillators which might at first sight appear very different from each other. We identify several specifications that are useful for design, such as frequency-locking behavior, phaselocking behavior, and specific output signal shape. We also identify two classes of design methods by which these specifications can be met, namely off-line methods and on-line methods. By relating these specifications to our framework and by presenting several examples of how oscillators have been designed in the literature, this article provides a useful methodology and toolbox for designing oscillators for a wide range of purposes. In particular the focus on synthesis of limit cycle dynamical systems should be useful both for engineering and for computational modelling of physical or biological phenomena.

show abstract

Space–time behavior of single and bimanual rhythmical movements: Data and limit cycle model.

Cited by 330 publications

References 53 publications

Deterministic and stochastic features of rhythmic human movement

Deterministic and stochastic features of rhythmic human movement

Modeling inter-human movement coordination: synchronization governs joint task dynamics

Engineering entrainment and adaptation in limit cycle systems

Contact Info

Product

Resources

About