Diffusion in Phase Space as a Tool to Assess Variability of Vertical Centre-of-Mass Motion During Long-Range Walking

Abstract

When a Hamiltonian system undergoes a stochastic, time-dependent anharmonic perturbation, the values of its adiabatic invariants as a function of time follow a distribution whose shape obeys a Fokker-Planck equation. The effective dynamics of the body's centre-of-mass during human walking is expected to represent such a stochastically perturbed dynamical system. By studying, in phase space, the vertical motion of the body's centre-of-mass of 25 healthy participants walking for 10-minutes at spontaneous speed, we show that the distribution of the adiabatic invariant is compatible with the solution of a Fokker-Planck equation with constant diffusion coefficient. The latter distribution appears to be a promising new tool for studying the long-range kinematic variability of walking.