Title :
Frenet-Serret and the Estimation of Curvature and Torsion
Author :
Kwang-Rae Kim ; Kim, Peter T. ; Ja-Yong Koo ; Pierrynowski, Michael R.
Author_Institution :
Inst. for Math. Stochastics, Georg-August-Univ. of Goettingen, Goettingen, Germany
Abstract :
In this paper we approach the problem of analyzing space-time curves. In terms of classical geometry, the characterization of space-curves can be summarized in terms of a differential equation involving functional parameters curvature and torsion whose origins are from the Frenet-Serret framework. In particular, curvature measures the rate of change of the angle which nearby tangents make with the tangent at some point. In the situation of a straight line, curvature is zero. Torsion measures the twisting of a curve, and the vanishing of torsion describes a curve whose three dimensional range is restricted to a two-dimensional plane. By using splines, we provide consistent estimators of curves and in turn, this provides consistent estimators of curvature and torsion. We illustrate the usefulness of this approach on a biomechanics application.
Keywords :
biomechanics; curvature measurement; differential equations; estimation theory; geometry; torsion; Frenet-Serret framework; biomechanics application; classical geometry; curvature estimation; curvature measurement; curve twisting; differential equation; functional parameters curvature; space-time curves; splines; straight line; three dimensional range; torsion estimation; torsion measurement; two-dimensional plane; Biomechanics; Bones; Differential equations; Knee; Skin; Splines (mathematics); Vectors; Binormal; biomechanics; bone pin and skin marker; differential equations; knots; normal; smooth curve; splines; tangent;
Journal_Title :
Selected Topics in Signal Processing, IEEE Journal of
DOI :
10.1109/JSTSP.2012.2232280
