Physical laws are a constant. Fuller, and many others, have pointed out that the physical laws pertaining to tensegrity are universal and independent of scale and, therefore, would effect all matter/energy, from the quantum to the universe, (see: Kroto H. 1988. Space stars, C60 and soot. Science 242 1139-1145). Quantum mechanics are a bit out of my depth and the universe is beyond my reach. I am still trying to fully understand biotensegrity, the application of tensegrity to biologic structures and physiology.
Good luck in your endeavors,
Stephen M. Levin, MD
Ezekiel Biomechanics Group
8608 Dixie Place
Mclean, VA 22102 USA
StevenO wrote:624.01 The tetrahedron is the only polyhedron, the only structural system that can be turned inside out and vice versa by one energy event.
When the ability of the tissues to adapt or compensate becomes overwhelmed by mechanical or physiologic stress, the fascial system responds by altering the patterns of tension and elasticity. The tensegrity matrix explains the physiologic changes, which manifest in injured or strained tissue. The apparent fibrosis of muscle and fascia can be seen as an altered electro-mechanical relationship at the molecular level. The matrix is thus converted from a neutral, flexible form to a strained, high-energy, linearly-stiffened mode. - Matrix Repatterning
junglelord wrote:Very well done!
Dr Roth is one of my direct teaches. Matrix Repatterning used to be called Tensegrity Therapy. I practice both evolutions of the medical model. His revelation came from learning Mechanical Link by Osteopath Paul Chauffour from the Upledger Institute.
Since I have a background in both electronic tech (ten years) and orthopedic therapy with the tensegrity model (15 years), I can marry the two real easy.
You Solar had no trouble doing the same right off the street so to speak.
I will again state that the icosahedron is the archetype model for tensegrity, not the tetrahedron. If one understands the Platonic Solids then one knows that the four below the icoshaedron are embedded in it. Zome teaches us that as a fact. To apprciate the way all five platonic solids effect reality one must work with the ichosahedron to fully understand all the implications.
WILCOCK’S AETHERIC EARTHQUAKE MODEL
Based on all of the above evidence, we can clearly see that there is a remarkable parallel between the aetheric model of the atom as a spherical torus and large-scale plasma formations such as the Earth’s core.
As Pasichnyk and many others have documented, increases in Solar activity are strongly correlated with increases in the amount and intensity of earthquakes on the Earth. Once these earthquakes occur, anomalous plasma formations are often observed as well.
Further support to this concept is seen in the phenomenon of “radar angels”, where radar operators would frequently pick up false signals over geophysically-active areas of the Earth.
Most radars are now equipped to screen out these signals, which appear to be caused by mostly invisible plasma spheres that are continually ejecting from the Earth in seismically-active regions.
So then, what exactly is an earthquake? We present the following as an informed supposition, based on the evidence presented throughout this book:
* We begin with a sudden surge of energetic activity, such as could occur from solar flares or other sources that we will discuss later.
* This surge abruptly increases the amount of energy streaming into the core of the Earth.
* The total amount of luminous plasma in the core then increases.
* However, there is no decrease in the pressure from the Earth surrounding and containing the plasma, so the extra energy has nowhere to go except to be compressed under a higher amount of pressure.
* Based on simple aetheric physics, if the energy surge is high enough, then this sudden pressure increase forces some of the plasma to displace into a higher density of aetheric energy.
* Once the plasma reaches a higher density, it can easily pass through the lower-density physical matter making up the form of the Earth that we now know and measure.
* At this point, the plasma is no longer contained by the massive compressing forces in the center of the Earth, but is free to move away from the Earth’s center via centrifugal force.
* Now, in this higher-density state, the plasma bubbles up towards the surface of the Earth, much as oil will bubble up to the top of water.
* Since pressure always flows from high to low, the plasma will naturally move towards the area of lowest aetheric energy density near the surface of the Earth.
* “Empty” vacuum space is much less dense than solid matter, and therefore has a much lower density of aetheric energy.
* Therefore, a relatively vacuum-sealed crack in the Earth’s crust has less aetheric energy density than the surrounding solid matter.
* The displaced plasma is naturally attracted into such cracks.
* Once the plasma reaches this space, pressure is relieved, and some of it displaces back down into its original plasma state that it held in the Earth’s core.
* However, since the temperature is now much lower, some of the plasma suddenly cools off.
* As the plasma suddenly cools, it crystallizes into new physical matter.
* This new matter forms quite suddenly along the edges of the crack.
* Remember that when water crystallizes into ice, it expands in size. Similarly, the volume of the plasma increases as it cools down (phase shifts) into physical matter.
* Great explosive force can be released as this new matter is created, since it pushes apart the surrounding landmass at the site of the crack.
* An earthquake is created as this occurs if the amount of new matter is large enough to cause a slippage along the fault line.
* In many cases, some of the plasma remains in a higher density state, and continues to pass out through the surface of the Earth.
* As this energy passes through the atmosphere, it may or may not shift down into a low enough density to become visible.
* If the plasma remains at a higher density, invisible “radar angels” are formed.
* If the plasma shifts back to its original density, “plasma formations” may be detected.
* If the plasma is in a reverberating, “wobbling” state, it may lapse between visibility and invisibility, moving in and out of two adjacent levels of aetheric density, as Prof. Ehrling Strand observed and filmed in Norway.
Certainly, the more conventional models of earthquake formation and the pressure of surface movements should still factor in as well; this is just a factor that can create more sudden changes.
This new model also helps to explain the phenomenon of “kimberlite pipes,” mentioned both by Dr. Dmitriev and Dr. V.L. Dyatlov. This phenomenon is considered in Russia to be “the great mystery of modern geology,” and it has been primarily observed in Alaska.
First, seismologists detect a sudden explosion and heat surge near the Earth’s surface. If the area where the explosion occurred is close enough to the surface, it can be drilled into and examined.
[In some cases, the Eskimo people have been able to hand-dig their way down to the site itself.]
An elongated hollow tube is discovered in the crust at the site of the explosion. Even more interestingly, and profitably, the inside of the tube is completely lined with diamonds!
Normally it is believed that diamonds and other such crystals take untold thousands of years to be created, yet in these cases they appear to have formed instantaneously.
This will make even more sense to us in Chapter 10 when we study the work of Dr. Krasnoholovets and others, who found that torsion fields naturally create greater hardness and crystallization in any matter that they are exposed to.
Metals that are exposed to torsion-wave-generating devices will become significantly harder and more crystallized in their form, and torsion fields can also create microcluster formations in water and other compounds.
Hence, a plasma formation contains a very high intensity of torsion fields, ready to compress into geometric crystals at a moment’s notice.
The astute reader should realize that there is another consequence to this earthquake model. In this model, when there is a sudden surge of energy increase in the Earth, the plasma is forced into a higher density and escapes from the core.
This in turn creates an earthquake, wherein new matter is created. However, it is also possible that if the energy increases in the core occur more slowly and regularly, then the entire size of the core itself could gradually expand without displacing into a higher density.
This, in turn, would increase the overall size of the Earth itself.
This certainly fits with the quantum model that we have proposed in the preceding chapters, since we have seen with microclusters, quasicrystals and Bose-Einstein condensates that atoms can group together into larger clusters that retain a singular identity.
The key here is that when enough energy is added to these structures, they will continue to expand in size. Microclusters start out as individual atoms that then “melt” together into larger, crystalline formations.
Quasi-crystals can be grown just like any other crystals over time, and yet they continue to maintain their uniquely holographic and Unified structure, which cannot occur if the atoms are maintaining an individual identity.
A Bose-Einstein condensate (superconductor) can also be expanded in size by the addition of new energy, though it will continue to behave as if it were a single atom.
In our model, all basic structures at all levels of size in the Universe behave according to these same energetic principles, and are capable of expanding as greater amounts of energy stream in.
So therefore, the Earth should be capable of continually growing in size as the core is continually replenished by new aetheric energy, much as would occur in the growth of an organism. This prediction is realized in the science of “Global Expansion Tectonics.”
5.4 GLOBAL EXPANSION TECTONICS
In 1933, Christopher Otto Hilgenberg was the first to show that if we shrink the Earth down to 55-60 percent of its current size, then all the continents would fit together just like a jigsaw puzzle, as seen in Figure 5.2.
He made the bold suggestion that this was caused by the Earth expanding in size; at one time in the past, it really was 55 to 60 percent of its current size. The most rigorous article that we have found on this topic is by James Maxlow , and shall be quoted as we proceed.
This new model is certainly not in today’s college textbooks, but it has been quietly gaining in popularity over the years.
An Expanding Earth Symposium was held in Sydney, Australia in 1981, and the Smithsonian Institution hosted a discussion meeting in 1989 where these concepts and others relating to global tectonic models were discussed. As Maxlow writes,
These arguments [at the Smithsonian meeting] indicated that there seems to be something questionable with the plate tectonic theory as it is currently presented (Kremp, 1992,) and that present concepts of plate tectonics / continental drift / polar wandering may need to be re-evaluated, revised or rejected (Smiley, 1992.)
Figure 5.2 – Hilgenberg’s “terrella” models of the expanding earth.
Smallest globe is 60% of current radius. (From Vogel, 1983)
The “plate tectonics” or “continental drift” model is currently in vogue among mainstream scientists.
In this model, the Earth has maintained a constant size throughout its entire lifespan, and the continents all originated as one giant mass known as “Pangaea”. Eventually, this continent cracked into several pieces, and the cracks were sites of volcanic activity.
As the new lava was ejected along these volcanic ridges and subsequently cooled by the oceans, the different pieces of the original continent were slowly pushed away from each other into their current positions.
However, in order for this “drift” to occur on an Earth of unchanging size, “what goes up must come down.” In more scientific terms, if there are areas of “orogenic uplift” where new crust is continually being formed, then there must also be “subduction zones” where the Earth’s crust is sinking back down into the mantle and again melting into a molten state.
As Maxlow indicates, this model has a major, major flaw:
No definitive evidence for “subduction zones” has ever been found on Earth.
The areas where subduction zones even might exist are far fewer than the Plate Tectonics model requires.
Or, to put it more simply,
We can easily demonstrate the Earth’s expansion with the observed data, but we have no means of proving that the alleged subduction is occurring at the same time.
Maxlow continues by mentioning that the conclusions of the “plate tectonics” model were based on an incomplete set of data:
In presenting Global Expansion Tectonics it must be realized that the global, geological and geophysical database has only now  reached the stage where any global tectonic hypotheses can be confidently quantified, challenged, and / or discarded.
With the new data in hand, the “plate tectonics” model can now be discarded.
However, according to Maxlow and other sources, there are two main reasons for why the mainstream scientific and geological community does not accept an Earth Expansion Theory:
1. Matter is not “supposed to” be able to expand in our current understandings of quantum physics.
2. The evidence needed to create a mathematical model that can accurately reproduce an Earth expansion process over time does not appear to exist.
The first point is effectively eliminated by the quantum models that we have discussed in this book, and Maxlow has provided the supportive evidence required for the second point.
As more and more information about the geophysics of the Earth is acquired, the Earth Expansion theory is only further enhanced in its credibility.
New maps of the patterns, speeds and directions of the spreading of the seafloor areas shows that the earth is “undergoing an exponential expansion from the Archean [period] to the present…”, according to Maxlow, and the maps and images to support these conclusions are presented in his paper.
Based on Maxlow’s mathematical models, the Earth should be expanding in size at a rate of approximately 21 millimeters per year. And indeed,
1. Carey in 1986 used satellite laser ranging measurements to calculate that the Earth’s radius was expanding by 24 millimeters per year, plus or minus eight millimeters.
2. Robaudo and Harrison in 1993 used VLBI and SLR geodetic measurements to conclude that the Earth was expanding at 18 millimeters per year.
The conventional explanation for this observed expansion of the Earth is that it is caused by the continual influx of dust and meteorites, but it also fits perfectly with Maxlow’s calculations based on straightforward data-gathering from ocean seafloor spreading.
Other scientists in Russia have concluded that the Earth makes sudden increases in its size at certain times in our geological history, and this could account for why Robaudo and Harrison only observed an 18-millimeter-per-year expansion instead of Maxlow’s calculated value of 21 millimeters.
The next obvious problem that this model raises is this: if all the continents were once part of a single outer surface of the Earth, then where do we put the oceans?
Maxlow suggests that in these early days, there was less overall water on the surface of the Earth, and “shallow epi-continental seas” had formed across various areas of what are now the continents.
The original crust on the Earth had reached a certain level of thickness, (probably as a result of cooling down from a molten state as it drifted away from the Sun,) but then as the Earth continued expanding, the newly forming crust was much thinner, and thus lower in height.
As the continents began breaking apart, these epi-continental seas emptied out into the lower-elevation cracks, forming early versions of our oceans.
This raises another question: “Where did all the water in our oceans come from if it wasn’t all originally there?”
The Earth “grows” in size by the continual increases in the aetheric energy it is receiving from the Sun and other sources.
The same energetic processes that increase the size of the Earth are also continuously creating new molecules such as hydrogen and oxygen in our atmosphere, thus thickening it in density.
Hydrogen and oxygen then bond together to form greater quantities of water, which rain down from the skies into the oceans, mixing with the salts in the Earth’s crust.
Interestingly, as we documented in the previous volume, the gas planets all have been observed to have Earth-sized rocky cores, so it seems plausible that the Earth will also eventually become a gas planet as it drifts farther away from the Sun.
In Chapter Eight we shall survey evidence from Dr. Aleskey Dmitriev that demonstrates that this creation of new atmosphere is an ongoing process, as new changes are being discovered in the atmospheres of the Earth and other planets such as Mars.
5.5 RADIAL, GEOMETRIC EXPANSION OF THE CONTINENTS
If the activity of the Earth is to share a common bond with the activity at the quantum level, then we should expect to see Platonic Solid geometry involved during the process of expansion, just as we see in the formation of a microcluster or quasi-crystal.
We have already seen Dr. Teodorani et al’s observations of plasma formations in Norway adopting spontaneous geometric configurations, and this suggests that the plasma in the Earth’s core must also have the same properties.
Furthermore, thanks to Pasichnyk’s detective work, we know that W.R. Corliss, A.M. Dziewonski and J.H. Woodhouse have confirmed that the Earth’s core displays “hexagonal symmetry,” meaning that it is in the form of a three-dimensional geometric solid which has six sides when seen from certain angles.
In his 1996 videotaped presentation, Gregg Braden indicates that this symmetry data suggests that the Earth’s core is shaped as a perfect dodecahedron, one of the five main Platonic Solids with twelve pentagonal faces.
Thus, the “microcluster” phenomenon of geometry continues to hold true at much larger levels of size than just the quantum realm. (An icosahedron also has very repetitive hexagonal symmetry.)
Let us not forget that geometry is the simple byproduct of vibration / pulsation in a fluidlike medium; Dr. Hans Jenny’s studies revealed that as the level of vibration / pulsation is increased in a fluid, the geometric forms that we see inside the fluid become more complex.
So, if the rate of vibration / pulsation in the Earth’s luminous core is continually increasing, then we should expect to see increasingly complex forms of geometry at work.
Bearing this in mind, in 1993, Vogel et al. came up with the following conclusions regarding the Earth Expansion Hypothesis, based on their extensive modeling of the Earth’s surface. If you reduce the Earth’s radius to 55 to 60 percent of its present size, then:
1. The continental outlines can be fitted together to form a closed crust;
2. The positions of the different continents with respect to each other remain generally constant, with their separation caused by a “radial expansion of the Earth” and;
3. The cause of the movements of continents resulted from an accelerating increase in radius with time, in accordance with sea-floor spreading…
An accordance of these three phenomena cannot be accidental, [but are due to] processes operating from within the interior of the Earth, resulting in Earth expansion.
The key that we need to see here is in point number 2, where Vogel et al. state that the separation of the continents occurs in a “radial” or spiraling movement.
Part of this model can be seen in Figure 5.3, based on Perry’s computer reconstruction of the Earth’s radial expansion.
When we study the hierarchical structure of the Platonic Solids once “nested” inside of each other, we see that there is always a spiraling movement as a less-complex form expands into one of greater complexity. This has been well covered in our previous volumes.
Figure 5.3 – Perry’s computer reconstruction of the radial expansion of the earth.
(From Carey, 1986)
Dr. Athelstan Spilhaus, an established scientist working for the National Oceanic and Atmospheric Association or NOAA, provided us with the proof that the Earth is indeed expanding into greater and greater forms of geometric harmony.
According to our communications with Dr. Bethe Hagens, Dr. Spilhaus’ findings in this area were featured in Scientific American magazine in the 1980s, and we are hoping to obtain a copy of the remaining images from that issue.
In Spilhaus’ model, the Earth is not expanding in size, but the underlying geometric formations that he discovered can still be directly applied to an expanding earth model, as all of his data is based on straight lines with consistent angular relationships.
Much like an expanding microcluster, the hierarchy of forms that the Earth has experienced are as follows:
1. Tetrahedron: When the “continent” of Pangaea first broke up, each major ‘crack’ was almost exactly the same length, or ‘equidistant’ to every other crack. These equidistant lines form the outline of a tetrahedron as the continents then radiate away from their original center. As we discussed in both previous volumes, this form continues to exert an energetic ‘signature’ on the Earth, and the work of Richard Hoagland and The Enterprise Mission has clearly demonstrated tetrahedral energy formations on other planets.
2. Cube-octahedron: As the continents continue to separate, their geometry expands into a greater complexity of equidistant lines, forming the combined shape of the cube and octahedron. As we wrote in The Shift of the Ages, Bruce Cathie has clearly demonstrated that this grid is also still active on the Earth. From these precise Grid measurements, Cathie made many breakthroughs in this new field of “harmonic aether physics” that are very useful, some of which have been given in Shift of the Ages.
3. Icosa-dodecahedron: The Earth’s continents have now expanded into the form of a combined icosahedron and dodecahedron of equidistant lines. Once more, the process of expansion into this stage occurs along spiraling, radial pathways.
In Figure 5.4, courtesy of the original NOAA paper, we can see Dr. Spilhaus’ final stage of Earth’s geometric expansion as it now stands today.
The main pentagon-shaped face that we see would be from the dodecahedron, and the triangular faces would be from the icosahedron. Obviously the dotted lines represent undersea ridges and/or mountain ranges.
It is not surprising to see this formation, considering that the Earth’s core appears to now be in the shape of a dodecahedron:
Figure 5.4 – Dr. Spilhaus’ final geometric expansion of Earth’s continents,
courtesy his NOAA paper.
Though Spilhaus’ data is quite satisfactory, there is a great deal of additional information to support the idea that such geometric forms now encircle the Earth.
The Russian team of Goncharov, Morozov and Makarov independently determined that the Earth had the form of an icosa-dodeca grid, [Fig. 5.5] based on the positions of the continents and undersea volcanic ridges.
The Mid-Atlantic Ridge runs precisely along with the zig-zagging vertical line in the Atlantic, as seen in the diagram. Both the pentagons of the dodecahedron and the triangles of the icosahedron can be seen in this image:
Figure 5.5 – Goncharov, Morozov and Makarov’s icosa-dodeca grid.
Interestingly, Goncharov et al. surveyed the locations of over 4000 different ancient sacred sites on the Earth, such as standing stones, pyramids, monoliths, menhirs, obelisks, temples, pagodas, stone cellars, stone circles, ziggurats, earth mounds and the like.
Without exception, every single ancient site they surveyed was situated somewhere on this icosa-dodeca grid.
We will learn why the ancients would have used such a technology in Chapter 9; it is related to the ability of a formation such as a pyramid to harness torsion waves for use in balancing the Earth.
We will see Russian and Ukranian research from esteemed sources that has proven that pyramids can decrease the severity of earthquakes, severe weather and radioactive emissions, while increasing the purity of water, underground oil and minerals.
Pyramids can also be used for healing, growth stimulation and consciousness expansion related to spiritual growth.
All of the above results on physical matter are created by the action of torsion waves, whose gentle pressure can create significant effects on matter when in a sufficiently concentrated form, and it is important to remember that these “grid lines” are primarily torsion-wave formations.
Torsion-field detectors will pick up a much stronger amount of torsion radiation along these lines than they will in other areas, and the node points where the lines cross are especially active. Thus, we may very well want to rebuild such a pyramid system across the Earth once again in order to offset the current damages that civilization is now producing.
In the event of a limited nuclear exchange and / or further environmental destruction, such a project will become eminently necessary, as it was after the fall of the lost ancient civilizations of Atlantis and Rama.
5.6 COUNTER-ROTATING ENERGY FIELDS AND GRID DYNAMICS
We remember that in Johnson’s quantum model, the atom is actually composed of counter-rotating energy fields. In order for an atom or molecule to become stable, the geometry must mesh together into a balanced formation.
Similarly, we can see in the final two stages of Dr. Spilhaus’ model of the Earth’s expansion that there are always two geometries involved; we have the combination cube and octahedron and the combination icosahedron and dodecahedron.
Even the original stage of the Earth’s expansion, which involved the tetrahedron, may have actually incorporated the octahedron as well, since the octahedron is directly infolded within the tetrahedron, as we saw in the last chapter.
Based on Johnson’s model, it appears that the icosahedron and dodecahedron seen in the Grid are indeed opposing energetic fields that have reached a state of bonded harmony, in the exact same fashion as a molecular compound is created in the quantum realm.
We believe that the stress created by these counter-rotating energy forces is the real cause for the Earth’s counter-clockwise rotation on its axis.
In this case, while the two geometric forms are bonded together, the geometry rotating counter-clockwise has a slightly stronger rotational force than the geometry rotating clockwise, and this causes the Earth to rotate in a counter-clockwise direction.
So, the available evidence suggests that the Earth indeed has a global energetic grid that was well understood and utilized by ancient civilizations. The key fact that we will explore in the rest of this section involves the phenomena that occur along the lines and nodes of this grid.
Though this information is not popularly known, it is nevertheless very real, and extensively documented in our previous volumes and several other sources.
For starters, we shall focus on the twelve equidistant points (vertices) of the icosahedron as now seen on the Earth’s surface, and bring in a list of anomalous properties compiled from the work of Richard Pasichnyk.
Again, this material was featured in the previous volume, but it is worthy of repetition at this point. We should remember here that Pasichnyk refers to these twelve areas as “the Fields”:
1. Terrestrial electricity spirals, strange sounds, and magnetic and gravity anomalies occur in each [area.]
2. The deepest parts of the ocean floor [are at these points.]
3. [The] ocean current patterns [flow around these points.] [Note: The data of Ivan P. Sanderson reveals that these current patterns show counter-rotational movement.]
4. Strong storms deep on the ocean floor [are seen at these points.]
5. Some of the highest values of ocean surface salinity [are seen at these points.]
6. The most plentiful locations for bursting bubbles, producing stronger atmospheric charge and other associations [are seen at these points.]
7. These same areas are high and low pressure systems in weather and storm centers.
8. Spiraling gaseous nebulae have been observed from space centering in each Field.
9. The Earth’s surface layer (lithosphere) and the physical aspects of plate tectonics (subduction zones, plate boundaries, rises, rifts, stress patterns, earthquake-wave anomalies, etc.) are related to the Fields’ locations (further discussion is in section 3.4).
10. Lighted displays (ionized particles) and dark masses (neutrons) have been observed repeatedly [in these areas.]
11. Patterns and changes in the upper atmosphere, radiation belts, and the magnetosphere show relationships to the Fields.
12. Eels, iron-precipitating bacteria, and electric fishes are geographically located in these areas.
13. More than 70 percent of all life on Earth is situated in relation to the Fields (between the 40-degree latitudes), which is ideal for the generation of electrical energy by life.
Indeed, a great portion of Pasichnyk’s Vital Vastness trilogy of books centers around the study of these “Fields” as they occur on Earth and other planets.
In Chapter 12 of our previous volume, we summarized a majority of convincing information from Pasichnyk that shows that these Fields are at work on each planet throughout our solar system.
As we can see, all of the above effects could be caused by the power that strong torsion fields can exert on physical matter, as torsion fields do create tangible pressure.
It is this pressure that appears to be responsible for forming the currents we measure in the oceans and atmosphere, which Pasichnyk’s research shows are all associated with the Earth’s Grid.
As we have already indicated, areas of higher torsion-field intensity are also areas where matter is capable of shifting into a higher level of aetheric density.
The key here is to realize that matter and energy can indeed be displaced into a higher level of aetheric density at these twelve nodes on the Global Grid, due to the high degree of torsion radiation in these areas, and this has already been documented and observed in the 20th century through the work of Ivan P. Sanderson, among others.
In 1972, Ivan Sanderson published an article entitled “The Twelve Devil’s Graveyards Around the World” in Saga magazine. These “Devil’s Graveyard” areas are the same as the “Fields” discussed by Pasichnyk, and they represent the points of the icosahedron on the Earth’s grid, as seen in Figure 5.6.
Just as a review, we know that each face of the icosahedron is a perfect equilateral triangle where every internal angle is 60 degrees. Within a sphere such as the Earth, the points of the icosahedron are located between 30 and 40 degrees latitude above and below the equator.
Each point is spaced at 72-degree intervals from the neighboring points, and except for the two at the poles, their exact geometric center is at 36 degrees North or South latitude.
All together, there are five points in the Northern Hemisphere, five in the Southern Hemisphere and two at the poles.
Figure 5.6 – The icosahedron (L) and its grid positioning on the Earth ®.
(Courtesy Nick Nelson)
Sanderson discovered these points by doing a massive meta-analysis of all available data on losses of aircraft and sailing vessels.
From this data, he determined that such disappearances were far more likely to occur at these twelve points than in any other areas.
In Charles Berlitz’ book The Bermuda Triangle, we are given a greater description of the properties of these areas, both in terms of Earth’s physical processes as well as the electromagnetic time-warp anomalies:
These areas… represent the nodal points where the surface ocean currents turn one way and the subsurface currents turn in another direction.
[Note: Again, we see counter-rotating energy forces.]
The great subsurface tidal currents sweeping tangentially, and influenced by different temperatures, set up magnetic vortices, affecting radio communication, magnetism – perhaps even gravity – and eventually, in special conditions, causing air and surface craft to vanish – sailing or flying off into a different point in time and space.
An interesting sidelight on the erratic behavior of these areas is underlined by Sanderson in describing the astonishing “early arrivals” of carefully clocked-in air flights where planes have arrived so far ahead of schedule that the only possible explanation would be that they had a tidal wind behind them blowing, for example, at 500 miles per hour.
[Note: Let’s remember that this kind of wind speed is usually only seen in the worst hurricanes.]
Such incidents may be the result of unrecorded winds but they seem to occur most frequently within the Bermuda Triangle and other vortex areas, as if these particular planes had encountered the anomaly but had skirted or been propelled safely through the “hole in the sky” that had cost so many travelers their lives.
The vanishings in areas such as the Bermuda Triangle or the Devil’s Triangle off the coast of Japan (which we have heavily documented in Chapter 10 of the previous volume) are produced when the ships or aircraft are displaced into a higher density of aetheric energy and do not return.
The anomalies related to time are given additional support by Drs. William Becker and Bethe Hagens in their article “The Planetary Grid: A New Synthesis”, which was reprinted in the book Anti-Gravity and the World Grid.
In this article, they reported on a time-based anomaly occurring at the node point near Hawaii:
A pilot flying with passengers near the Hawaii zone [of the icosahedron of energy points on the Earth] suddenly found himself in a “dead zone” without [the use of his electromagnetic] instruments and unable to communicate beyond the cockpit.
After flying some 350 miles, [which most likely took an hour or more,] the “phenomenon” lifted and the pilot found that tower officials could find no measurable time that had elapsed between the beginning of his “dead zone” experience and its end. [emphasis added]
These changes in the rate of time’s passage fit clearly with Kozyrev’s theories that the flow of time is a function of torsion radiation, which is in turn a function of aetheric energy density.
If you move into an area of higher aetheric density, time may well slow down for you, as it did for the above pilot.
In such cases as this, the ship does return from the higher-density area to our own level of aetheric energy density, and the survivors live to tell the tale.
Admittedly, this does appear to be an exception to the rule, but it appears that ancient cultures had a better understanding of how to not get “lost” in such vortex-based aetheric displacements, and were able to use them constructively, such as for physical travel across the Earth.
In the previous volume we discussed the case histories of firsthand witnesses who flew into such areas of higher aetheric density and returned alive.
The ultimate example is the case of Charles Wakeley. Briefly, as Wakeley passed into an area of higher density in the Bermuda Triangle vortex, his electromagnetic instruments displayed very anomalous behavior, and a bluish-green glow began growing on the tips of his wings, eventually turning white and spreading into the cockpit.
At the peak of this event, he was surrounded by blinding white light that seemed to come “from everywhere at once,” and the effect then dissipated at the same speed that it had begun with, allowing him to regain control of the aircraft.
As we said in our previous volume,
It is very likely that the tremendous light that he saw around himself would not have been visible to those on the ground; it was a visual consequence of his own body moving into a more energetic area.
To an outside observer there would be no change, as his body moves into an area of higher-vibrational energy that is outside of the time and space that the ground-based observer would see.
If he did not return, his plane would simply disappear from view, and if he did return then nothing would appear to have happened to an outside observer; they would only see his plane as a seamless continuity.
5.7 THE BECKER-HAGENS GRID AND NEW DISCOVERIES OF “GREAT CIRCLES”
An even more complete model of the Earth’s grid has been worked out by Drs. William Becker and Bethe Hagens, known as the Becker-Hagens grid. We have covered this information in both of our previous volumes.
This grid was produced by taking two icosahedrons and rotating one of them slightly out of phase with the other, a concept originated by Buckminster Fuller in his Synergetic Geometry magnum opus.
A 120-sided polyhedron is formed by this process which describes all the Platonic Solids. The next figure shows the basic structure of this model of the Grid, though each triangle has many sub-lines within it as well.
Let us now continue with another excerpt from our previous volume that helps us to understand what we are seeing:
From this grid design, we can see that the current structure of continents, island chains, mountain ranges, oceanic ridges and much more all follow this pattern.
By slowly and carefully studying this map, as we have documented in The Shift of the Ages, we can see that it looks as if the Earth itself is a flexible balloon that is surrounded by this grid.
If the grid is akin to a set of wires, and the wires are exerting force on the balloon, then we can see how they are pushing the landmasses into their current formation.
Figure 5.7 – The Becker-Hagens Grid, inspired by the work of Chris Bird.
By studying the map carefully, it becomes easy to see how the continents are pushed and pulled by this Grid.
We have diligently covered all the most important points in both of our previous volumes. For just a few examples, note how South America is perfectly surrounded by lines, and how the bottom of that landmass is pushed to the right by node 58, while node 49 pushes in on its eastern coast near Rio de Janiero in Brazil.
Also note how Australia is perfectly stretched out between nodes 43 and 45, with the top of the continent forming a nearly circular bay area around node 27, also incorporating the smaller landmass of New Guinea directly above it.
In order to make certain formations more visible, in the next figure we digitally altered the map so that it can be seen exclusively from the area of the Pacific Ocean.
If we think back to Dr. Jenny’s models of Platonic Solids in vibrating fluid, we remember that spiraling curves could be seen between the various nodes, forming a smooth contrast to the straightness of the lines on the geometries themselves.
We would expect to see similar formations on the Earth if this aetheric model is indeed correct. Through the study of island chains and mountain ranges, we can indeed see large-scale circular structures just like those that surrounded the formations in Dr. Jenny’s experiments.
Figure 5.8 – Wilcock’s “Great Circle” Discoveries in Asia / Pacific Ocean area of Earth’s Grid
For starters, when we look at a world map that shows mountain ranges, we will discover that almost the entire western edge of Asia is bordered by a smoothly curving set of mountains that has no single name.
In the map, we have crudely drawn in this mountain range with a series of curling lines at the far left of the larger circle.
The position of this mega-range corresponds with extreme precision to an ellipse that can be drawn between nodes 12, 4 and 5, passing up through Pakistan and Afghanistan, the western edge of China, the border of Russia and Mongolia and then the border of Russia and northeast China, continuing right until the ocean coastline.
The elongated sea in Russia just to the right of node point 4 (see previous figure) is almost perfectly aligned with this ellipse as well.
We can now combine this data with other smaller-scale formations, such as the island chain of Taiwan, the Philippines, New Guinea and the Solomon Islands, to show that there are indeed giant circular structures of energy upwellings to complement the sharp lines of the geometric grid.
Importantly, both of these “Great Circles” neatly and symmetrically contact many nodes on the Earth’s grid, and both circles perfectly align with Russia and Alaska at their northern edge.
Other formations can be seen on this map as well, such as the chain of islands formed by the bottom peninsula of Myanmar (Burma,) Thailand and Malaysia, and most specifically the primary island chain of Indonesia.
This island chain forms an almost perfect semi-circle just to the left of the smaller circle that we have drawn into this map.
It is also highly interesting to note that the smaller circle on this map looks very similar to the final stage of cell mitosis, with nodes 14 and 16 resembling cell nuclei and the vertical line between them resembling the dividing chromosomes.
In the next figure, we show an energetic structure that is centered on node number four in Siberia, where many magnetic anomalies have been recorded and analyzed by Dr. Aleskey Dmitriev and others.
If we take this point as our center, then we can see an expanding spiral that appears to have formed from it.
This spiral has three major “arms”, formed by the Ural Mountains in Russia, seen on the left hand side of the outer circle, the Himalayan mountains that cross through Pakistan, Kashmir, India, Nepal, Bhutan and Tibet, (which we have only shown with a very thin line to emphasize their curving, spiral formation,) and the Japanese island archipelago.
Once you see this inward-curling spiral structure for yourself in a world atlas, looking at the actual mountain ranges, you will never fail to see it again.
This clearly illustrates the leftover traces of the Earth’s stages of geometric expansion at work. Furthermore, the style of this map projection distorts the true shape of Russia’s upper coastline, and thus in reality this circle is far more directly aligned with the shape and position of the coast than we can see here:
Figure 5.9 – Wilcock’s spiraling “vortex” formation incorporating Ural Mountains,
Himalayas and Japan
So, with the information that we have uncovered in this chapter, we now have established a clear connection between the energetic behavior that has been observed at the quantum level with that of the planetary level.
Just as “explicit angular-dependent many-body forces” must be invoked to explain the formation of microclusters, similar geometric forces are clearly at work in the plasma formations observed in Hessdalen, Norway and indeed in the Earth itself, which has a geometrically-structured plasma core and an evolving geometric complexity of the continental positions as it expands in its physical size.
We also now have a new view of earthquake formation that explains why we see plasma formations during times of high seismic activity, and which also fits in with the concept that the Earth’s core is composed of luminous plasma.
The anomalous disappearances of ships and aircraft at the node points of our Global Grid clearly point to the validity of a model involving multiple densities of aether, where matter can be displaced from one density to another if the torsion-wave pressure within the molecules rises high enough to cross the vibratory rate of the speed of light.
From here, our next step is to expand this “holographic” model even further, by demonstrating that these same energetic principles are at work throughout the entire Universe, at every level of size, with simple but precise harmonic principles defining their relationships to each other.
This will truly establish a unified model that has never before been seen in any modern scientific work, but which is most likely a return to ancient understandings of the Divine Cosmos.
The following two chapters form the heart of the model that this book is presenting, and will draw upon all of the previous knowledge that we have covered in this book up until now.
14.22.2 RAMANUJAN’S SYSTEM
In the case of Ramanujan, the modular functions are defined as mathematical operations where an incredible and almost unheard-of degree of symmetry exists within them — symmetry that allows for such higher-density geometries to exist. And within this symmetry, in many, many different and synchronistic ways, Ramanujan’s modular functions always referred us back to the number eight as the key organizing force behind the structure of dimensions or densities in this universe.
This can be seen in excerpts from the book Hyperspace by Dr. Michio Kaku. Here we should keep in mind that "Superstring" theory is very similar to aetheric concepts, in that the entire quantum realm is seen as being the product of energetic, vibrating "Strings":
Srinivasa Ramanujan was the strangest man in all of mathematics, probably in the entire history of science. He has been compared to a bursting supernova, illuminating the darkest, most profound corners of mathematics, before being tragically struck down by tuberculosis at the age of 33, like Riemann before him.
Working in total isolation from the main currents of his field, he was able to rederive 100 years’ worth of Western mathematics on his own. The tragedy of his life is that much of his work was wasted rediscovering known mathematics. Scattered throughout the obscure equations in his notebooks are these modular functions, which are among the strangest ever found…
In the work of Ramanujan, the number 24 (8 × 3) appears repeatedly. This is an example of what mathematicians call magic numbers, which continually appear where we least expect them, for reasons that no one understands. Miraculously, Ramanujan’s function also appears in string theory… In string theory, each of the 24 modes in the Ramanujan function corresponds to a physical vibration of the string…
When the Ramanujan function is generalized, the number 24 is replaced by the number 8. Thus, the critical number for the superstring is 8 + 2, or 10. This is the origin of the tenth dimension. The string vibrates in ten dimensions because it requires these generalized Ramanujan functions (based on the number 8) in order to remain self-consistent. In other words, physicists have not the slightest understanding of why ten and 26 dimensions are singled out as the dimension of the string.
[Now read the next sentence carefully, and remember that this is being spoken by a mainstream scientific authority figure:]
It’s as though there is some kind of deep numerology being manifested in these functions that no one understands…
In the final analysis, the origin of the ten-dimensional theory is as mysterious as Ramanujan himself. When asked by audiences why nature might exist in ten dimensions, physicists are forced to answer, "We don’t know."
As we can see from the above passage, modern Superstring physicists feel that the energies making up the dimensions are "not symmetrical" in Ramanujan’s octave-based system, and they therefore arbitrarily add two extra dimensions in order to make everything mathematically fit together.
The ten dimensions of conventional "Superstring theory" come about from this abstraction — and in an equally inelegant manner, String theorists took Ramanujan’s group of three octaves or 24 dimensions and added two more to get 26.
One would think that if you had three different Octave systems, each of which had tremendous musical symmetry, that you would not want to break that symmetry in such a manner as to add only two more to the entire group — but most of them are probably not musicians!
In footnote number 13 on page 346 at the back of Hyperspace, Kaku shows us how the Octave can be re-introduced by taking away the two "extra" dimensions that they have added:
However, two of these vibratory modes can be removed when we break the symmetry of the string, leaving us with 24 vibratory modes, which are the ones that appear in the Ramanujan function.
Now that we understand vibration and the forms that it takes, it should be easy to see how this apparent mistake came about. As we will see in later chapters, our entire understanding of energy and quantum physics has many distortions.
When these distortions are cleared up and we see the geometry that is at work, we find the exact "symmetry" that the String theorists believe we need to preserve with two extra "dimensions." With someone of Ramanujan’s genius, it is more than likely that he or his information source was well aware of what they were doing; the simple fact that we still do not comprehend many of his theorems should be a big clue that we haven’t yet "solved the puzzle."
The addition of the two extra dimensions is simply a convenient shortcut to make everything look good on paper.
14.23 TANIYAMA-SHIMURA: MODULAR FUNCTIONS AS GEOMETRIC OBJECTS
As our research in this area continued after writing The Shift of the Ages, we were highly intrigued to discover that a mainstream scientific model already exists that directly associates Ramanujan’s Octave-based modular functions with Platonic geometry!
This comes about from the Taniyama-Shimura conjecture, which was mathematically proven only in the 1990’s. This conjecture essentially states that all of Ramanujan’s "Octave-based" modular functions can essentially be modeled as elliptic curves.
While the full definition of "elliptic curves" is quite complex, the main point is that these curves are actually shaped like a torus or doughnut, and are seen to wrap around Platonic geometries, specifically the cube. We were naturally very excited to discover this fact.
(The mathematics that described this configuration are what led to Andrew Wiles’ breakthrough mathematical proof in the mid-1990’s of Fermat’s Last Theorem, considered the "greatest mathematical puzzle of the last 300 years.")
So to put it in simple terms, modern mathematical theories are indeed supporting the results of our models of a fluid in vibration — i.e., Platonic geometries that are surrounded and created by spiraling or curving lines. As the Taniyama-Shimura conjecture shows us, Ramanujan’s octave-based modular functions are ultimately geometric in nature, and the geometry is a surprisingly exact match to what we would have expected it to be in the harmonic model.
14.24 THE GEOMETRIC OCTAVE: PROBLEM SOLVED!
Seeing the dimensions or densities as organized into an octave gives us a perfect theory of vibration that unifies our seen and unseen universe into a single, utterly simple whole — a "theory of marble", as the physicists would call it, that is streamlined and elegant. It is vibration that connects all of these concepts together.
We know that sound pitches or tones are nothing but vibrations of air molecules, and that colors are nothing but vibrations of photons of light. Similarly, the Platonic solids are another form of expressing vibration — in this case, the vibrations of the energy waves that converge on a point, rotating and spiraling inwards and outwards from a commonly shared center, in the form of Svara or "The Great Breath."
In the Vedic cosmology, we have a unique and very explainable positioning of the sphere and all five Platonic solids into the Octave. In this system, the sphere and icosahedron are both seen twice, and that is how we get an octave of eight positions from six basic shapes — the five Platonic Solids and the one sphere. The image of this is pictured under 14.24.6 below.
In The Shift of the Ages, we have already described and diagrammed very clearly how the energy of the third-density octahedron could be seen to expand into the star tetrahedron and on up the chain. So far, with these geometric visualizations, we found the Hindu model to be well supported.
However, we had run into a glitch when we tried to visualize how the second-density icosahedron could expand into the third-density octahedron, even though Robert Lawlor said that it could be done in his book Sacred Geometry.
We puzzled over this problem for nearly four years, and only recently in October 2000 did we have the immense satisfaction of stumbling over a website that gives us a clear-cut diagram of how this would be done! Once again, the first object must make an angular tilt as it expands into the next object in the sequence.
So, we will now present the full range of tilts and adjustments that must be made, in order, so that the reader can see how everything changes in this progression of shapes.
14.24.1 CENTRAL ICOSAHEDRON INTO OCTAHEDRON
By angularly tilting the icosahedron on its side (we have not calculated the exact number of degrees of tilt that are necessary,) and adding a special harmonic tetrahedral shape in twelve different places, we can build the octahedron. And as we will see later, a crop circle appeared in early 2000 that showed us the inner workings of this expansion!
In any of these cases where the Platonic Solids are seen to expand, a ratcheting, tilting motion must take place as the spiral causes the shape to naturally expand - and it is the simple increase in vibrational density that produces this result.
When you have a higher vibration, the shapes transform into objects of greater complexity. It is interesting to see how the icosahedron can appear at both ends of the spectrum in the Vedic model, at the second and seventh dimension.
In this Octave system, the icosahedron is the first geometry to crystallize out of the sphere and the final geometry to exist before the vibrations melt back into the purity of the sphere once again. We hope in the future to find a computer programmer who can create a truly accurate animation of this pulsating, ratcheting, tilting, rotating process, as ultimately it is not difficult with the software technologies now available. For those who are interested, the image and detail of the icosahedron to octahedron expansion is by Robert Conroy.
14.24.2 OCTAHEDRON INTO TETRAHEDRON
The octahedron lies at the center of the star tetrahedron, and this is easily seen in the next diagram below, where in the top right we show how one of eight tetrahedrons attached to each face of the octahedron on the right will then form the star tetrahedron to the left.
It is important to remember at this point that these harmonic shapes do not simply "sit there" in space-time - they are rotating. The spherical torus that surrounds them, described and illustrated in previous chapters, shows us where the axis of rotation is. Notice that if the octahedron would normally rotate on an axis that went from tip to tip, it would be forced to tilt at a 45-degree angle to its side as it becomes the star tetrahedron, which then would have a different tip-to-tip axis.
In this picture the octahedron is the shaded object on the right, and its star tetrahedron transformation is shown on the left. We can see that the octahedron needed to be tilted on its side in order to "fit" into the new shape, where each face of the octahedron sprouts up into a tetrahedron. Similar movements can be seen in the Windows "3D Flower Box" screen saver, at Start- Settings- Control Panel- Display- Screen Saver- 3D Flower Box- Settings- Tetrahedron:
14.24.3 STAR TETRAHEDRON INTO CUBE
Next, if we connect the tips of the star tetrahedron together we will get a cube. This can be seen in the above diagram, where the hexagonal "box" formation is drawn around the six outer tips of the star tetrahedron. By studying the Global Grid information of Bruce Cathie and other sources, it appears that the cube has a "best fit" in the spherical torus, and in this "best fit," none of the tips are aligned with the poles of the CU.
The most symmetrical and stable position for the cube seems to be when four of its points are above the equator and four below. This would cause the north-south axis of the CU to cut through the center of two cube faces, one on the top and one on the bottom.
If this is the natural "rest point" for the cube in the CU, then we would need to rotate or tip the star tetrahedron to its side as it expands, again by exactly 45 degrees. Furthermore, this orientation of the cube allows us to fit in the octahedron in its proper orientation, with its tips aligned north to south. We can see this cube-octahedron alignment in the image that is seen after the next immediate one below.
14.24.4 CUBE INTO DODECAHEDRON
Next, each face of the cube expands up into a rooftop-type shape made of five equidistant lines, and the three and two-sided edges of the ‘rooftops’ join together to form pentagons. In this next image, only two sides of the cube are visible as dotted lines, and they do not appear identical in shape. For this expansion, the cube must tilt into one of two different angular positions (which we have not calculated) as the dodecahedron’s own rotational axis is established:
14.24.5 DODECAHEDRON INTO FINAL ICOSAHEDRON
Bruce Rawles’ Interpenetrating Platonic Solids, formed with the POV program.
Finally, every face of the dodecahedron will spiral and blossom into a star or Chevron shape, forming the icosahedron. Each line in the new icosahedron divides each line of the dodecahedron exactly in half. It seems that no rotational tilt of the axis is necessary to complete this transition, as the Grid shows us that the dodecahedron is perfectly and equally nested together with the icosahedron.
The above diagram, created on Bruce Rawles’ Sacred Geometry website by the Persistence of Vision (POV) ray-tracing program, shows the Hindu-prescribed growth of a dodecahedron into an icosahedron clearly on the far right side.
Have you ever seen the direct mapping of icosahedral and dodecahedral geometries onto our earth? You could consider the earth as a living example of the zome structure. It strikes me that you could very well apply the tensegrity understandings to the way our earth deals with "tensions". The most advanced inter-related structure at present is the icosa-dodeca interface, check out these maps that David Wilcock has gathered.
NEWS FROM THE MATRIX REPATTERNING CENTER
We would like to share a recent experience with Matrix Repatterning that highlights the value of becoming a Certified Matrix Repatterning Practitioner. This patient suffered a severe injury to his right knee, during a motor vehicle collision, in which his knee struck the dash of a car, completely rupturing his patellar tendon. Over the course of the next 30 years, his knee deteriorated and became severely and constantly painful. The following is a copy of his letter to the head orthopedics at a major hospital:
To: Dr. G From: David G
As you are aware, I had a TKR (total knee replacement) in January 2003 by Dr. R. which, over a period of several months, became quite troublesome. He, at the time, did not have any answers for me to gain any relief so I pursued several surgeons along with a trip to the Mayo Clinic, but all to no avail. I finally got referred to yourself, and after examination it was determined that a "revision" was in order, and was completed by yourself and your team on October 31, 2005. After several follow-up exams at your clinic the constant, nagging pain persisted with no alternatives but to attend a Pain Clinic.
I was then introduced to Dr. Roth and had my first examination and treatment in May '07. I will only say that after 1 visit, I briskly walked out of the exam room, and for the first time in a very long time, without the pain that has plagued me for all these years. My condition, after several treatments, has improved dramatically to the point that I now walk pain free and golf as often as the budget allows.
If you, or any of your colleagues, would like to discuss my situation in depth do not hesitate to drop me a line.
Cheers for now!!
(It has been a year since his first treatment, and he is doing just fine!)
This orthopedic surgeon is considered one of the leading specialists in the country. We treated another one of his patients, who was scheduled for a second hip replacement after the first one failed. It had been problematic for 5 years previously. After 2 treatments, her hip immediately stabilized and became pain free. Upon visiting Dr. G. for a review, he determined that she no longer required surgery! So...he called us, to find out what we were doing. He was quite impressed, and asked us to send him more information. We will keep you posted.
As you are aware, we are now working with Dr. John H. Page, MBBS (Hons) MSc ScD, Department of Epidemiology, Harvard University School of Public Health. He is currently developing studies to evaluate the effects of Matrix Repatterning on arthritis, cardiac function, sleep apnea and type 1 diabetes mellitus.
INCREASING PUBLIC AWARENESS
We are in the process of developing a publicity campaign to increase public awareness about the benefits of Matrix Repatterning. As a Certified Matrix Repatterning Practitioner, you will be recognized as a preffered provider with the skills and confidence to provide the highest level of structural therapy on the planet.
Link to Dr. Roth's latest article in Canadian Chiropractor Magazine:
http://www.canadianchiropractor.ca/inde ... ew&id=1028
All the best,
Dr. George Roth and Team
> Date: Mon, 12 May 2008 14:55:04 -0400
> From: firstname.lastname@example.org
> To: email@example.com
> Subject: RE: I finally understand electronics.
> > This is why all longitudinal transmitters or any longitudnal device
> > will always need a spiral.This is because the non material
> > dimensional structure of charge is a vortex.Double layers always
> > create vortex/charge. A law nature revealed to me last month. This
> > is true at every level in all systems, be it plasma, air, water, and
> > electronic components.
the question by Chris.
> What I've yet to see or completely understand though is precisely how
> very small vortices can combine to create macroscopic vortices.
My second reply
Well when I wrote that I was still not putting it in a total context of APM
I was still getting out of my classical mess.
The template of 5-D space resonance combined with the units of angular momentum (Planck's Constant) and the Aether unit (2 spin rotating magnetic field) are the two compressive componets of the tensegrity model. This double compression geometry overlaid on the 5-D dimensional constructs of APM create a vortex and matter. Therefore a vortex shape in matter will control the function created by that structure. It is a tensegrity structure, it is a electricmagnetic electrostatic structure and a angular momentum and Aether unit structure, all superimposed.
The spiral is the archetype form. Tesla pointed out it is the primary current, AC transverse is a sub set. A day at the beach will teach us this as we observe transverse waves break down into vortex forms as the wave collapses at the double layer where water meets shore.
Structure and Function cannot be seperated. The structure of the non material dimensions and the units mentioned create all the functions (field, force) from the vortex archetype form. The most advanced electronic equipment ever made in my mind, next to Classical Mechanic size Quantum devices (Superconductor etc) is the Impulse Magnifying Transmitter, the Theta Pinch. The first star machine on earth was designed by Tesla. In any form we need the spiral vortex structure to manipulate the longitudinal function.
Repatterning does not specifically approach the patient as Structural Integration/Rolfing does, as we recognize the importance of the gravity field relationship on the tensegrity structure. Matrix Repatterning allows tensegrity self correction independent of gravity. Rolfing works with gravity as a tool.
Users browsing this forum: No registered users and 1 guest