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A Metric on Shape Space with Explicit Geodesics

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arxiv 0706.4299 v2 pith:7JSPNJ3G submitted 2007-06-28 math.DG math.AP

A Metric on Shape Space with Explicit Geodesics

classification math.DG math.AP
keywords curvesgeodesicsmodulospacechangeclassicalclosedcompute
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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This paper studies a specific metric on plane curves that has the property of being isometric to classical manifold (sphere, complex projective, Stiefel, Grassmann) modulo change of parametrization, each of these classical manifolds being associated to specific qualifications of the space of curves (closed-open, modulo rotation etc...) Using these isometries, we are able to explicitely describe the geodesics, first in the parametric case, then by modding out the paremetrization and considering horizontal vectors. We also compute the sectional curvature for these spaces, and show, in particular, that the space of closed curves modulo rotation and change of parameter has positive curvature. Experimental results that explicitly compute minimizing geodesics between two closed curves are finally provided

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