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Curves from twisted circles

This program takes the parametric equations for arbitrary simple closed curves and finds the corresponding functional rotation that "deforms" a circle into a 3D curve for which the 2D projection is this simple closed curve.

The rotation is accomplished using a functional unit quaternion which can be shown to be a 1-parameter homeomorphism.

The problem is indeterminate, so there are multiple solutions; we randomly select for the purpose of plotting the resultant curves.

For this work, I colloborated with OpenAI's GPT-3.5 model via the OpenAI API

Notation

  • Points on the curves (p) are expressed as "pure" quaternions (i.e. p=(0,x,y,z)).
  • Rotations (q) are expressed as "unit" quaternions (i.e. norm(q) = 1).
  • We perform a quaternion rotation using Hamilton products: p2 = q(p1)q'

More detailed theoretical foundations are available here:

P. T. Jardine and S. N. Givigi, "Flocks, Mobs, and Figure Eights: Swarming as a Lemniscatic Arch", IEEE Transactions on Network Science and Engineering, 2022.

Plots

Here are some results. Note that the Bernoulli curve does not make use of a pure quaternion and so is not strictly homeomorphic.