Nozomu Matsuura scite author profile

In this paper, we consider the discrete deformation of the discrete space curves with constant torsion described by the discrete mKdV or the discrete sine-Gordon equations, and show that it is formulated as the torsion-preserving equidistant deformation on the osculating plane which satisfies the isoperimetric condition. The curve is reconstructed from the deformation data by using the Sym-Tafel formula. The isoperimetric equidistant deformation of the space curves does not preserve the torsion in general. However, it is possible to construct the torsionpreserving deformation by tuning the deformation parameters. Further, it is also possible to make an arbitrary choice of the deformation described by the discrete mKdV equation or by the discrete sine-Gordon equation at each step. We finally show that the discrete deformation of discrete space curves yields the discrete K-surfaces.

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Discrete improper affine spheres

Matsuura

Urakawa

2003

Journal of Geometry and Physics

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Nozomu Matsuura

MOTION AND B^|^Auml;CKLUND TRANSFORMATIONS OF DISCRETE PLANE CURVES

Discrete KdV and Discrete Modified KdV Equations Arising from Motions of Planar Discrete Curves

Discrete mKdV and discrete sine-Gordon flows on discrete space curves

Discrete improper affine spheres

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