Basic Principles 3 (1 2 3)

Sub-levels in Triplicities

As discussed in the Basic Principles, a subject area or a framework of knowledge can be reduced to a simple system possessing a three-fold nature, and a Geometry is used to represent this system.

Since information contains detail on many different levels, each of the three polarities within a Triplicity will naturally contain more information than what is depicted in a normal Geometry.

Information associated with each and any of the three polarities within a Triplicity can be further reduced to sub-Triplicities. These sub-Triplicities are directly related to the polarity they are subdividing, so are shown in the Geometries as being connected through further arrows.

Sub-Triplicities can consist of any of the 9 Geometries as described in the second section.

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Structure of Sub-Triplicities

In depicting multi-level information on the Geometries, each Triplicity must be a sub-set of one of the three polarities in a higher order Triplicity. This is what is meant by" Triplicities within Triplicities".

A particular polarity can not have more than 1 Triplicity below it at the same order of level, as shown in the diagram at right, where the Circle Polarity has 3 different Triplicities stemming directly from it.

Each sub-level order of Triplicities must be contained within a hierachical order, as shown in the diagram at right where the Triangle polarity is reduced to a further Triplicity, and its sub-level polarities are each further reduced to finer Triplicites.

If there can be 2 or more sets of Triplicities identified within a particular polarity, the sub-Triplicities need to be kept separate from each other (unless there is some relationship between the two, in that case, a new triplicity needs to be drawn to accommodate that relationship.), and drawn as separate hierarchies to the original higher order level polarity.

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Adding Components to Geometries.

If new information is being introduced to an existing framework, say through comparison, or improvement etc., Triplex Unity Theory is able to handle this need as well. The new information is assigned a new polarity, and is depicted by a different shape to the original three (see diagram 3).

Arrows are then rearranged to demostrate how the new item of information fits in with the current triplicity. Because we consistently use the Triangle, Circle and Square for our Geometries, even with added elements, we can still visually discern how various sets of information within a system relates to each other, even with new elements coming into system.(see diagram 4)

Diagram 4. A new polarity added to a triplicity.

More advanced principles to be added soon.

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