Allometric Control, Inverse Power Laws and Human Gait

[1]  J. Huxley Problems of relative growth , 1932 .

[2]  Devendra Sahal,et al.  Patterns of Technological Innovation , 1984 .

[3]  K. Schmidt-Nielsen,et al.  Scaling, why is animal size so important? , 1984 .

[4]  J B Bassingthwaighte,et al.  Regional myocardial flow heterogeneity explained with fractal networks. , 1989, The American journal of physiology.

[5]  B. West Physiology in Fractal Dimensions , 1990 .

[6]  James Theiler,et al.  Testing for nonlinearity in time series: the method of surrogate data , 1992 .

[7]  D. Cox LONG‐RANGE DEPENDENCE, NON‐LINEARITY AND TIME IRREVERSIBILITY , 1991 .

[8]  Bruce J. West,et al.  Fractal physiology , 1994, IEEE Engineering in Medicine and Biology Magazine.

[9]  Bruce J. West,et al.  Fractal physiology for physicists: Lévy statistics , 1994 .

[10]  Jeffrey M. Hausdorff,et al.  Increased Walking Variability in Elderly Persons with Congestive Heart Failure , 1994, Journal of the American Geriatrics Society.

[11]  Jeffrey M. Hausdorff,et al.  Is walking a random walk? Evidence for long-range correlations in stride interval of human gait. , 1995, Journal of applied physiology.

[12]  L. Liebovitch,et al.  "Fractal dynamics of human gait: stability of long-range correlations in stride interval fluctuations". , 1996, Journal of applied physiology.

[13]  Jeffrey M. Hausdorff,et al.  Altered fractal dynamics of gait: reduced stride-interval correlations with aging and Huntington's disease. , 1997, Journal of applied physiology.