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J Biomech. 2010 Mar 22;43(5):906-12. doi: 10.1016/j.jbiomech.2009.11.006. Epub 2009 Dec 16.

Mathematical modeling and simulation of seated stability.

Author information

  • 1Department of Orthopaedic Surgery, Wake Forest University, Winston-Salem, NC 27157, USA. mtanaka@wfubmc.edu

Abstract

Various methods have been used to quantify the kinematic variability or stability of the human spine. However, each of these methods evaluates dynamic behavior within the stable region of state space. In contrast, our goal was to determine the extent of the stable region. A 2D mathematical model was developed for a human sitting on an unstable seat apparatus (i.e., the "wobble chair"). Forward dynamic simulations were used to compute trajectories based on the initial state. From these trajectories, a scalar field of trajectory divergence was calculated, specifically a finite time Lyapunov exponent (FTLE) field. Theoretically, ridges of local maxima within this field are expected to partition the state space into regions of qualitatively different behavior. We found that ridges formed at the boundary between regions of stability and failure (i.e., falling). The location of the basin of stability found using the FTLE field matched well with the basin of stability determined by an alternative method. In addition, an equilibrium manifold was found, which describes a set of equilibrium configurations that act as a low dimensional attractor in the controlled system. These simulations are a first step in developing a method to locate state space boundaries for torso stability. Identifying these boundaries may provide a framework for assessing factors that contribute to health risks associated with spinal injury and poor balance recovery (e.g., age, fatigue, load/weight, and distribution). Furthermore, an approach is presented that can be adapted to find state space boundaries in other biomechanical applications.

Copyright (c) 2009 Elsevier Ltd. All rights reserved.

PMID:
20018288
[PubMed - indexed for MEDLINE]
PMCID:
PMC2834871
Free PMC Article

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