On the use of a Euclidean norm function for the estimation of local dynamic stability from 3D kinematics using time-delayed Lyapunov analyses. Issue 10 (October 2016)
- Record Type:
- Journal Article
- Title:
- On the use of a Euclidean norm function for the estimation of local dynamic stability from 3D kinematics using time-delayed Lyapunov analyses. Issue 10 (October 2016)
- Main Title:
- On the use of a Euclidean norm function for the estimation of local dynamic stability from 3D kinematics using time-delayed Lyapunov analyses
- Authors:
- Beaudette, Shawn M.
Howarth, Samuel J.
Graham, Ryan B.
Brown, Stephen H.M. - Abstract:
- Highlights: To estimate local dynamic stability (LDS) state-space reconstruction is necessary. The Euclidean norm function ( N ) can be used to collate the dynamics of a 3D system. With N, non-linear transformations can occur, skewing Lyapunov exponents (λmax ). λmax estimate error can be reduced by eliminating zero-crossings in kinematic data. 3D components should be shifted completely into positive space prior to applying N . Abstract: Several different state-space reconstruction methods have been employed to assess the local dynamic stability (LDS) of a 3D kinematic system. One common method is to use a Euclidean norm ( N ) transformation of three orthogonal x, y, and z time-series' followed by the calculation of the maximum finite-time Lyapunov exponent ( λ max ) from the resultant N waveform (using a time-delayed state space reconstruction technique). By essentially acting as a weighted average, N has been suggested to account for simultaneous expansion and contraction along separate degrees of freedom within a 3D system (e.g. the coupling of dynamic movements between orthogonal planes). However, when estimating LDS using N, non-linear transformations inherent within the calculation of N should be accounted for. Results demonstrate that the use of N on 3D time-series data with arbitrary magnitudes of relative bias and zero-crossings cause the introduction of error in estimates of λ max obtained through N . To develop a standard for the analysis of 3D dynamic kinematicHighlights: To estimate local dynamic stability (LDS) state-space reconstruction is necessary. The Euclidean norm function ( N ) can be used to collate the dynamics of a 3D system. With N, non-linear transformations can occur, skewing Lyapunov exponents (λmax ). λmax estimate error can be reduced by eliminating zero-crossings in kinematic data. 3D components should be shifted completely into positive space prior to applying N . Abstract: Several different state-space reconstruction methods have been employed to assess the local dynamic stability (LDS) of a 3D kinematic system. One common method is to use a Euclidean norm ( N ) transformation of three orthogonal x, y, and z time-series' followed by the calculation of the maximum finite-time Lyapunov exponent ( λ max ) from the resultant N waveform (using a time-delayed state space reconstruction technique). By essentially acting as a weighted average, N has been suggested to account for simultaneous expansion and contraction along separate degrees of freedom within a 3D system (e.g. the coupling of dynamic movements between orthogonal planes). However, when estimating LDS using N, non-linear transformations inherent within the calculation of N should be accounted for. Results demonstrate that the use of N on 3D time-series data with arbitrary magnitudes of relative bias and zero-crossings cause the introduction of error in estimates of λ max obtained through N . To develop a standard for the analysis of 3D dynamic kinematic waveforms, we suggest that all dimensions of a 3D signal be independently shifted to avoid the incidence of zero-crossings prior to the calculation of N and subsequent estimation of LDS through the use of λ max . … (more)
- Is Part Of:
- Medical engineering & physics. Volume 38:Issue 10(2016:Oct.)
- Journal:
- Medical engineering & physics
- Issue:
- Volume 38:Issue 10(2016:Oct.)
- Issue Display:
- Volume 38, Issue 10 (2016)
- Year:
- 2016
- Volume:
- 38
- Issue:
- 10
- Issue Sort Value:
- 2016-0038-0010-0000
- Page Start:
- 1139
- Page End:
- 1145
- Publication Date:
- 2016-10
- Subjects:
- Euclidean norm -- Non-linear dynamics -- Kinematics -- Local dynamic stability -- Lyapunov exponent -- New method
Biomedical engineering -- Periodicals
Biomedical Engineering -- Periodicals
Physics -- Periodicals
Génie biomédical -- Périodiques
Biomedical engineering
Electronic journals
Periodicals
610.28 - Journal URLs:
- http://www.medengphys.com ↗
http://www.sciencedirect.com/science/journal/13504533 ↗
http://www.clinicalkey.com/dura/browse/journalIssue/13504533 ↗
http://www.clinicalkey.com.au/dura/browse/journalIssue/13504533 ↗
http://www.elsevier.com/journals ↗ - DOI:
- 10.1016/j.medengphy.2016.07.001 ↗
- Languages:
- English
- ISSNs:
- 1350-4533
- Deposit Type:
- Legaldeposit
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