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On a torus (donut) surface, when the torus major-radius:hole-radius profile is Phi⁴:1 (~6.854:1) the path of a helical winding has a slope on the helix equal to the quotient of the knot winding ratio.

Therefore, using the golden ratio (Phi = sqrt(5) X 1/2 + 1/2 = 1.61803399...) as the helical slope of a toroidal winding will create a helix that can never return to its starting point on the donut. I.e., an irrational slope cannot plot an integer harmonic helix on the torus surface. A golden slope on the golden donut will wind around the donut forever —or until dampened, in the case of a magnetic density wave traveling a golden toroidal path.

And as there are many adjacent whole numbers in the Fibonacci number sequence with a quotient approximating the golden ratio, easiest and shortest knot winding on a certain donut is the 3:2 winding ratio.

About four times longer than the 3:2 winding is the 13:8 knot winding. The slope of the 13:8 winding is 13/8 = 1.625 = Phi + 0.0069 almost.

When only one of the halves of 13:8 knots of a similar left-hand or right-hand chirality, from peripheral points on the donut are plotted, we see the middle helices group in four-s, with a gap of four windings.  All the windings are the same helical chirality, and are winding a helix around the donut ring in the same chiral handedness, left- or right-chirality of the helix.

Chiral paths arise by the dual choice of directions to get to the other side of a torus form. The handedness of the chirality is determined from the rotation direction of the helix, when viewed from the peripheral node of the bifilar half.

Each half is electrically energized in a certain sequence, and the (average) base-resonance of the (chaotic) ring oscillation of The Field Array is the second harmonic of the full winding comprised of both halves.

A second harmonic above the base resonance of a system will place oscillating and opposing electromagnetic potentials at play, as two oscillating halves, oscillating 180 degrees out of phase (when one is up, the other is down).

The chiral groupings in bands of four helical windings at any one moment, in principle, will be at opposite potentials at any point in time. 

This 2nd-order self-harmonic of chiral halves is curiously decomposed into a pattern of a 3:2 knot.  The geomagically-detangled knot windings create a magnetic self-harmony upon coherent operation (well tuned, well built, repeatable) with randomized pulse-pumping (inherent in ring oscillator design, with exaggerated chaos due to the switching- segmentation of magnetic paths, as halves.)  

Design conjecture: The ring oscillator is chaotic when driven, and a ring of sequentially energized halves in the ring oscillation is yet more chaotic.

A helical slope of the golden ratio (1.618033~ : 1) plotted like a torus knot on a torus profile of golden proportion (major:hole radii = Phi4:1) is not a knot, because it will never be harmonic with itself —because the slope is irrational, and will never find rational harmony to form a knot loop.  By definitions.

However, the 3:2 knot winding, and the 13:8 knot winding each approximate the golden ratio as the helical slope of the winding, but the respective approximations are on either side of the golden ratio.
 
3/2 = 1.50
golden ratio = 1.618033988749894...
13/8 = 1.625