The Law of Conservation of Motion

Discussion concerning the first major re-evaluation of Dewey B. Larson's Reciprocal System of theory, updated to include counterspace (Etheric spaces), projective geometry, and the non-local aspects of time/space.
Post Reply
User avatar
bperet
Posts: 1501
Joined: Thu Jul 22, 2004 1:43 am
Location: 7.5.3.84.70.24.606
Contact:

The Law of Conservation of Motion

Post by bperet »

In examining the various ideas behind "conservation" laws (polarity, energy, etc... thanks Gopi), I find there is one basic conservation law required in RS2 -- The Law of Conservation of Motion.

This law is simple, and Rule #1 in a computer model:

"In any interaction, motion is conserved."

In simple terms, there is no net gain or loss to the total motion of the system under consideration. If speed or energy is lost in a compound motion, it must be gained somewhere else. If gained, it must be lost from somewhere else.

In addition to general conservation of motion, Nehru's Law of Conservation of Direction must also apply:

"The representation of scalar motion in the conventional reference system conserves direction."

In other words, the projection of scalar motion into the conventional reference system will always result in TWO equal and opposite manifestations of motion:

1) Euclidean space: bi-vector

2) Polar counterspace: bi-rotation

The consequences of bi-rotation are discussed in detail in Nehru's articles on the topic; the result being the structure of the photon and its observed characteristics, which is the current model used by RS2 simulations.

Just as we can polarize a bi-rotation into "linear" (CW/CCW) or "circular" (CW/CW or CCW/CCW) rotations, the same logic applies to the bi-vector -- the bi-vector can be "linearly" polarized (+/- = stationary) or "circularly" polarized (+/+ or -/-), which we observe as vectorial motion or translation.

It is by transforming the bi-vector we move from "scalar" to "coordinate" motion in extension space, as a simple matter of the laws of conservation of motion and direction.
Every dogma has its day...
User avatar
bperet
Posts: 1501
Joined: Thu Jul 22, 2004 1:43 am
Location: 7.5.3.84.70.24.606
Contact:

Bi-vectors and Bi-rotations (image)

Post by bperet »

See attached image that visualizes the concept of neutral (linear polarized) and vectorial (polarized) bi-vectors and bi-rotations.

(NOTE: Attachments are not sent via e-mail; you must log in to http://forum.antiquatis.org to view/download the image).
Attachments
bivecrot.GIF
bivecrot.GIF (15.75 KiB) Viewed 5245 times
Every dogma has its day...
Post Reply