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CHAPTER
THREE: SACRED GEOMETRY IN THE QUANTUM
REALM
3.1 ATLANTEAN SECRETS
REVISITED
As illustrated in our previous
volume, a majority of the unified cosmological
picture that we have been describing in
this book is provided in exquisite detail
throughout the Vedic scriptures, which
date themselves as being 18,000 years
old. It is highly likely that the entire
cosmology that we are discussing was well
known by both the Atlanteans and the Ramans
during ancient times. Then, roughly 12,000
years ago, a worldwide cataclysm caused
the destruction of both civilizations.
As the years passed, those who inherited
the scientific knowledge would have more
and more difficulty seeing “the
big picture.”
Almost all sacred traditions,
including those of the Vedas, insisted
that there was a hidden order that unified
all aspects of the Universe, and that
with sufficient study and visualization
of the underlying geometric forms of this
order, the mind of the Initiate could
be connected with the Oneness of the Universe,
enabling great feats of consciousness
and mind-over-matter capability to occur.
Some of these visualizations took the
form of studying mandalas, such as the
Sri Yantra formation. Others preferred
to engage in dances where the movements
and music were in tune with these geometric
patterns. Still others preferred to assemble,
sculpt and / or draw these forms with
a compass and straightedge, hence the
importance of the main symbol of the Masonic
fraternity, which has the letter “G”,
symbolizing “God,” “Geometry”
and the “Great Architect of the
Universe,” surrounded by a compass
above it and a straightedge below it.
Pre-Masonic groups such as the Knight
Templars chose to encode these geometric
relationships into their sacred structures,
such as the stained-glass windows in cathedrals.
3.2 SACRED GEOMETRY
AND THE PLATONIC SOLIDS
Hence, the cornerstone of
knowledge for secret mystery schools regarding
this hidden order in the Universe has
always been sacred geometry. We have written
extensively on this subject in both of
our previous books, and the reader is
encouraged to refer back to them for greater
understanding. In short, sacred geometry
is simply another form of vibration, or
“crystallized music.” Consider
the following example:
First, we vibrate a guitar
string. This creates “standing waves,”
meaning waves that do not move back and
forth across the string but remain stable
in one place. We will see some areas where
there is an extreme of vertical movement,
representing the top and bottom of the
wave, and other areas where there is no
vertical movement, known as nodes. The
nodes that are formed in any type of standing
wave will always be spaced evenly apart
from each other, and the speed of the
vibration will determine how many nodes
will appear. This means that the higher
the vibration rises, the more nodes we
will see.
In two dimensions, we can
either use an oscilloscope or vibrate
a flat circular “Chladni plate”
and see nodes develop that will form common
geometric forms such as the square, triangle
and hexagon when connected together. This
work has been repeated many times by Dr.
Hans Jenny, Gerald Hawkins and others.
- If the circle has three
equally spaced nodes, then they can
connect to form a triangle.
- If the circle has four
equally spaced nodes, it can form a
square.
- If it has five nodes,
it forms a pentagon.
- Six nodes form a hexagon,
et cetera.
Though this is a very simple
concept in terms of wave mechanics, Gerald
Hawkins was the first to establish mathematically
that such geometries inscribed within
circles were indeed musical relationships.
We may be surprised to realize that he
was led to this discovery by analyzing
various geometric crop formations that
would appear overnight in the fields of
the British countryside. This has been
covered in both of our previous volumes.
The deepest, most
revered forms of sacred geometry are three-dimensional,
and are known as the Platonic solids.
There are only five formations in existence
that follow all the needed rules to qualify,
and these are the eight-sided octahedron,
four-sided tetrahedron, six-sided cube,
twelve-sided dodecahedron and twenty-sided
icosahedron. Here, the tetrahedron is
shown as a “star tetrahedron”
or interlaced tetrahedron, meaning that
you have two tetrahedra that are joined
together in perfect symmetry:
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| DODECAHEDRON |
ISOCAHEDRON |
Figure 3.1 – The
five Platonic Solids.
Here are some of the main
rules for these geometric solids:
- Each formation will have
the same shape on every side:
- equilateral triangle faces on
the octahedron, tetrahedron and
icosahedron,
- square faces on the cube, or
- pentagonal faces on the dodecahedron.
- Every line on each of
the formations will be exactly the same
length.
- Every internal angle
on each of the formations will also
be the same.
And most importantly,
- Each shape will fit perfectly
inside of a sphere, all the points touching
the edges of the sphere with no overlaps.
Similar to the two-dimensional
cases involving the triangle, square,
pentagon and hexagon inside the circle,
the Platonic Solids are simply representations
of waveforms in three dimensions. This
point cannot be stressed strongly enough.
Each tip or vertex of the Platonic Solids
touches the surface of a sphere in an
area where the vibrations have canceled
out to form a node. Thus, what we are
seeing is a three-dimensional geometric
image of vibration / pulsation.
Both the students of Buckminster
Fuller and his protégé Dr.
Hans Jenny devised clever experiments
that showed how the Platonic Solids would
form within a vibrating / pulsating sphere.
In the experiment conducted by Fuller’s
students, a spherical balloon was dipped
in dye and pulsed with “pure”
sound frequencies, known as the “Diatonic”
sound ratios. A small number of evenly-distanced
nodes would form across the surface of
the sphere, as well as thin lines that
connected them to each other. If you have
four evenly spaced nodes, you will see
a tetrahedron. Six evenly spaced nodes
form an octahedron. Eight evenly spaced
nodes form a cube. Twenty evenly spaced
nodes form the dodecahedron, and twelve
evenly spaced nodes form the icosahedron.
The straight lines that we see on these
geometric objects simply represent the
stresses that are created by the “closest
distance between two points” for
each of the nodes as they distribute themselves
across the entire surface of the sphere.
Figure 3.2 – Dr.
Hans Jenny’s Platonic Solid formation
in spherical vibrating fluid.
Dr. Hans Jenny conducted
a similar experiment, a small part of
which is pictured here in Figure 3.2,
wherein a droplet of water contained a
very fine suspension of light-colored
particles, known as a “colloidal
suspension.” When this roughly spherical
droplet of particle-filled water was vibrated
at various “Diatonic” musical
frequencies, the Platonic Solids would
appear inside, surrounded by elliptical
curving lines that would connect their
nodes together, as we see in the picture,
where it is clear that there are two tetrahedrons
in the central area. If the droplet were
a perfect sphere instead of a flattened
sphere, then the formations would be even
more clearly visible.
3.3 PLATONIC SOLIDS
AND “SYMMETRY” IN PHYSICS
The mystery and significance
of the Platonic Solids has not been completely
lost to modern science, as these forms
fit all the necessary criteria for creating
“symmetry” in physics in many
different ways. For this reason, they
are often seen in theories that deal with
multi-dimensionality, where many “planes”
need to intersect in symmetrical ways
so that they can be rotated in a number
of ways and always remain in the same
positions relative to each other. These
multi-dimensional theories include “group
theory,” also known as “gauge
theory,” which consistently features
various Platonic models for “infolded”
hyperdimensional space.
These same “modular
functions” are considered to be
the most advanced mathematical tools available
for the study and understanding of “higher
dimensions,” and the “Superstring”
theory is entirely built off of them.
In short, the Platonic Solids are already
known to be the master key to unlock the
world of “higher dimensions.”
Remember that we have only briefly mentioned
the above points, as they have been well-addressed
in our previous volumes, and the key is
symmetry. When we keep in mind the symmetrical
quality of the Solids as we have indicated,
Dr. Wolff’s words from Chapter 5
entitled On the Importance of Living in
Three Dimensions should make good sense
to us:
Pg. 71 – As your
advisor in exploration, I can tell you,
“Whenever you see a situation
of symmetry in a physical problem, stop
and think! Because you will nearly always
find an easier way to solve the problem
by using the symmetry property.”
This is one of the rewards of playing
around with symmetry. The ideas are
neat…
In
mathematics and geometry, there
is a need to be precise; so there symmetry
is defined to mean that a function or
a geometric figure remains the same,
despite: 1) a rotation of coordinates,
2) movement along an axis, or 3) an
interchange of variables.
In
physical science, which is our
main concern, the existence of a symmetry
usually means that a law of Nature does
not change, despite: 1) a rotation of
coordinates in space, 2) movement along
an axis through space, 3) changing the
past into the future such that t becomes
–t, 4) an interchange of two coordinates
such as exchanging x with y, z with
–z, etc. or, 5) the change of
any given variable. [emphasis added]
The Platonic Solids have
the greatest geometric symmetry of any
shapes in existence, though Dr. Wolff
does not call them by name here. In the
next excerpt from Dr. Aspden, he refers
to the Platonic Solid forms in the aether
as “fluid crystals,” and explains
how they can have an effect similar to
a solid, even while they are appearing
in a fluidlike medium:
…19th century physicists
were puzzled by the aether because it
exhibits some properties telling us
it is a fluid and some telling us it
is a solid. That was the perception
from a time when little if anything
was known about ‘fluid crystals’.
The displays in many pocket calculators
use electrical signals and rely on the
properties of a substance that, like
the aether, exhibits properties characteristic
of both the liquid state and the solid
state as a function of electric field
disturbances. [emphasis added]
This gives us a “solid”
explanation for why Tesla said that the
aether “behaves as a liquid for
matter, and as a solid for light and heat.
The Platonic Solids actually do act as
if they were structural frameworks within
the aether, organizing the energy flows
into specific patterns.
Hence, the Platonic Solids
are the simple geometric forms of “crystallized
music” that will naturally form
themselves in the aether when it pulsates.
Another important point to remember is
that as the hierarchy of Platonic Solids
“grow” into each other, the
movement will always occur along spiral
pathways, predominantly rooted in the
classic “phi” ratio. Torsion
waves have been seen to follow the “phi”
pattern as well, which shall be more fully
explored when we discuss the under-appreciated
“pyramid power” phenomenon
and the “cavity structural effect”
pioneered by Dr. Victor Grebennikov in
Chapter Seven.
3.4 MICROCLUSTER
PHYSICS
Just as we were finishing
up the first half of this book, a new
associate alerted us to the burgeoning
new field of “microcluster physics,”
which changes our entire view of the quantum
world by presenting us with a whole new
phase of matter that does not obey the
conventionally accepted “rules.”
Microclusters are tiny “particles”
that present clear and straightforward
evidence that atoms are vortexes in the
aether that naturally assemble into Platonic
Solid formations by their vibration /
pulsation. Furthermore, these new discoveries
pose quite a challenge for those who still
believe that there must be single electrons
orbiting a nucleus instead of standing-wave
electron clouds of aetheric energy that
assemble into geometric patterns. The
story of “microclusters” first
broke into the mainstream world in the
December 1989 issue of Scientific American,
in an article by Michael A. Duncan and
Dennis H. Rouvray:
Divide and subdivide a solid
and the traits of its solidity fade away
one by one, like the features of the Cheshire
Cat, to be replaced by characteristics
that are not those of liquids or gases.
They belong instead to a new phase of
matter, the micro cluster… They
pose questions that lie at the heart of
solid-state physics and chemistry, and
the related field of material science.
How small must an aggregate of particles
become before the character of the substance
they once formed is lost? How might the
atoms reconfigure if freed from the influence
of the matter that surrounds them? If
the substance is a metal, how small must
this cluster of atoms be to avoid the
characteristic sharing of free electrons
that underlies conductivity? [emphasis
added]
Less than two years after
this story broke in the mainstream, the
science of microcluster physics was realized
in its own graduate-school textbook authored
by Satoru Sugano and Hiroyasu Koizumi.
Microcluster Physics was published by
the respectable, mainstream Springer-Verlag
corporation as volume 21 in a series of
texts in the field of materials science.All
of the quotes from this text that we shall
use are from its revised second edition,
which was released in 1998. In Sugano
and Koizumi’s text, we are told
that with the new discoveries of microclusters,
we can now arrange groupings of atoms
into four basic categories of size, each
with different properties:
- Molecules: 1-10 atoms.
- Microclusters: 10-1000
atoms.
- Fine Particles: 1000-100,000
atoms.
- Bulk: 100,000+ atoms.
When we study the above
list, we would initially expect that microclusters
would have traits in common with molecules
and with fine particles both, but in fact
they have properties that neither display,
as Sugano et al. explain here:
Microclusters consisting
of 10 to 10^3 atoms exhibit neither
the properties of the corresponding
bulk nor those of the corresponding
molecule of a few atoms. The microclusters
may be considered to form a new phase
of materials lying between macroscopic
solids and microscopic particles such
as atoms and molecules, showing both
macroscopic and microscopic features.
However, research into such a new phase
has been left untouched until recent
years by the development of the quantum
theory of matter. [emphasis added]
As we continue reading,
we learn that microclusters do not form
randomly from any group of 10-1000 atoms;
only certain “magic numbers”
of atoms will gather together to form
microclusters. The next quote describes
how this was first discovered, and when
we read it we should remember that the
“mass spectrum” being mentioned
describes spectroscope analysis, which
we covered in the last chapter. When “cluster
beams” are being discussed, this
means that atoms (such as Na, or sodium)
are being blasted through a tiny nozzle
to form into a “beam” that
is then analyzed. Most importantly, as
the atoms blast out of the nozzle, some
of them spontaneously gather into microclusters,
which demonstrate anomalous properties:
The microscopic features
of microclusters were first revealed
by observing anomalies of the mass spectrum
of a Na [sodium] cluster beam at specific
sizes, called magic numbers. Then it
was experimentally confirmed that the
magic numbers come from the shell structure
of valence electrons. Being stimulated
by these epoch-making findings in metal
microclusters and aided by progress
of the experimental techniques producing
relatively dense, non-interacting microclusters
of various sizes in the form of microcluster
beams, the research field of microclusters
has developed rapidly in these 5 to
7 years [since the first 1991 edition
of the book.] The progress is also due
to the improvement of computers and
computational techniques…
The field of microclusters
is attracting the attention of many
physicists and chemists (and even biologists!)
working in both pure and applied research,
as it is interesting not only from the
fundamental point of view but also from
the viewpoint of applications in electronics,
catalysis, ion engineering, carbon-chemical
engineering, photography and so on.
At this stage of development, it is
felt that an introductory book is required
for beginners in this field, clarifying
fundamental physical concepts important
for the study of microclusters. This
book is designed to satisfy such a requirement.
It is based on series of lectures given
to graduate students (mainly in physics)
of the University of Tokyo, Kyoto University,
Tokyo Metropolitan University, Tokyo
Institute of Technology and Kyushu University
in the period of 1987-1990. [emphasis
added]
Our next quote comes from
the first area in Sugano and Koizumi’s
book where specific details are given
regarding the highly anomalous physical
properties of microclusters. Though they
are only slightly smaller than fine particles
in terms of the number of atoms, they
are much more stable. Here, the greater
stability refers to the fact that microclusters
burn at a much higher temperature than
molecules or fine particles of the same
elements. According to David Hudson, (whom
we shall discuss later,) Russian scientists
were the first to discover that microclusters
must be burned for more than 200 seconds
to reveal a color spectrum to be analyzed,
whereas all other known molecular compounds
burn up in a maximum of about 70 seconds:
When we arrive at the
fragment called microcluster with a
radius of the order of 10 angstroms
by further dividing fine particles,
we see that we have to use physics different
from that for fine particles.The essential
difference is derived from the theoretical
postulate, partly supported by experiments,
that microclusters of a given shape
and size can, in principle, be extracted
and their properties can be measured,
even though this kind of measurement
is impossible for fine particles. This
postulate may be justified by considering
the fact that clusters of a given regular
shape are very stable as compared with
those of the other shapes, the number
of which is rather small. In contrast
to this fact, fine particles of different
shapes and a fixed size forming a big
ensemble to allow a statistical treatment
are nearly degenerate in energy. This
makes impossible the extraction of fine
particles of a given shape.
Clear-cut evidence has
been obtained such that microclusters
of alkali [1.8] and noble [1.9] metal
elements in the form of a cluster beam
have a nearly spherical shape at the
size of the so-called magic numbers.
A magic number means a specific size
N [i.e. the number of atoms in the cluster]
where anomalies of abundance in the
mass spectra are found. This indicates
that microclusters of those sizes are
relatively stable as compared with those
of neighboring sizes. [emphasis added]
The “nearly spherical”
shapes that are described above will be
seen in later quotes as the Platonic Solids
and related geometries. Our next passage
is probably too technical for most readers
and can be skipped over, but it is a clear-cut
description of how the “cluster
beams” are being made and analyzed
and what specific “magic numbers”
of atoms emerged. Furthermore, we should
note that the clusters that are formed
become electrically neutral, which is
another anomalous and unexpected result:
As an example, we show
the mass spectrum of the Na cluster
beam in Fig. 1.5. The beam is produced
by the adiabatic expansion of a heated
Na and Ar gas mixture through a nozzle.
The Na clusters in the beam are photoionized,
mass analyzed by a quadrupole mass analyzer,
and finally detected by an ion-detection
system. Detailed examinations of the
experiment verify that the mass spectrum
thus observed reflects that of [electrically]
neutral clusters originally produced
by the jet expansion. The anomalies
of abundance of the size N, being 8,
20, 40, 58 and 93 (Fig. 1.5), are regarded
as the magic numbers of neutral Na clusters.
[emphasis added]
Now pay very close attention
to the next sentence, as its significance
can easily be missed:
In what follows, we shall
show that these magic numbers are associated
with the shell structure of valence
electrons moving independently in a
spherically symmetric effective potential…
[emphasis added]
What this is telling us
is that the hypothetical “electrons”
are no longer bound to their individual
atoms in microclusters, but rather move
independently throughout the entire cluster
itself! Remember that in our new quantum
model, there are no electrons, only clouds
of aetheric energy that are flowing in
towards the nucleus via the Biefield-Brown
effect. In this case, the microcluster
acts as one single atom, with the center
of the cluster becoming akin to the positively-charged
atomic nucleus where the negatively-charged
energy is flowing in. Interestingly, in
keeping with the fluidlike behaviors of
the aether, the next passage suggests
that the microclusters can have properties
similar to a fluid as well as a solid:
[The symmetry of] metal
microclusters seems to reveal that microclusters
belong to the microscopic world like
atoms and molecules, whereas fine particles
belong to the macroscopic world. This
is true in some aspects, but not so
in every aspect. In Chap. 2 we shall
discuss that, at finite internal temperatures,
microclusters may reveal the liquid
phase as encountered in the macroscopic
world... [emphasis added]
The next excerpt comes from
a completely different study by Besley
et al., referenced at the end of this
chapter, entitled Theoretical Study of
the Structures and Stabilities of Iron
Clusters. Obviously, their work builds
directly off of Sugano and Koizumi’s
textbook and the findings that went into
its production. Here, the key is that
Besley et al.’s research points
to anomalous electrical and magnetic properties
possessed by microclusters that are not
seen either in molecules or in condensed
matter:
Clusters are also of interest
in their own right, since for small
clusters there is the possibility of
finite size effects leading to electronic,
magnetic or other properties which are
quite different from those of molecules
or condensed matter. There has also
been a considerable research effort
into understanding the geometries, stabilities
and reactivities of gas phase bare metal
clusters from a theoretical viewpoint.
[emphasis added]
And now, as we skip ahead
to page 11 of Sugano et al.’s microcluster
physics textbook, we come to section 1.3.1
entitled Fundamental Polyhedra. This is
where the connection between microclusters
and the geometry of Johnson’s physics
becomes readily apparent:
Recently, it has been
discussed [1.12] that stable shapes
of microclusters are given by Plato’s
five polyhedra; the tetrahedron, cube,
octahedron, pentagonal dodecahedron,
icosahedron, [i.e., the Platonic Solids];
and Keplers’ two polyhedra of
rhombic faces; the rhombic dodecahedron
and rhombic triacontahedron…
It is very important to
note that tetrahedra are not space-filling,
as shown in Fig. 1.9, and icosahedra,
trigonal decahedra and pentagonal dodecahedra
with five-fold rotational symmetry are
non-crystalline structures: they do
not grow into the periodic structure
of the bulk. If the polyhedron is a
non-crystalline structure, then the
microcluster has to undergo a phase
transition to a crystalline structure
on the way of growing into the bulk.
[emphasis added]
For one who has studied
sacred geometry for many years, it is
amazing to consider that at a level far
too tiny for the naked eye, atoms are
grouping together into perfect Platonic
Solid formations. It is also interesting
to consider that some of these microclusters
also have fluidlike qualities, allowing
them to flow from one type of geometric
structure into another. In their text,
Sugano and Koizumi have assumed that certain
polyhedra such as the icosahedron and
dodecahedron are non-crystalline, and
must therefore undergo a phase change
before they could become a larger crystallized
object. However, later in this chapter
we will present hard, irrefutable evidence
that the entire model of crystallography
is flawed, and that under certain circumstances,
formations very similar to microclusters
can be formed at larger levels of size,
from two or more atomic elements grouped
together.
Importantly, as the reader
thumbs through the rest of Sugano et al.’s
textbook, scores of diagrams of atoms
grouped into Platonic Solids are seen.
We learn that the “magic number”
groupings of atoms will, in every case,
form into one of the geometric structures
mentioned above. If we took a tetrahedron,
for example, and constructed it out of
a certain number of marbles that all had
an equal width, then we would need an
exact “magic” number of marbles
to construct a tetrahedron of a given
size. This is the same as Buckminster
Fuller’s model of “close-packed
spheres,” and in its simplest form
is expressed by seeing that if you put
three marbles together into a triangle
and then place a fourth marble above it
in the middle, you will see a tetrahedron
form.
Even more interestingly,
on page 18 of the Microcluster Physics
textbook, Sugano et al. have a photograph
of a gold cluster consisting of “about
460” atoms, where we can clearly
see the close-packed sphere structure
of the atoms inside, forming unmistakable
geometry. These images are taken by a
scanning electron microscope at very high
magnification, and the structure of the
cuboctahedron geometry [Fig. 3.3, L] is
clearly visible in a series of different
angles. Interestingly, the cluster is
seen to undergo different geometric changes
from the cuboctahedron to other forms
in its structure from image to image,
again suggesting a fluidlike quality,
and unseen “stresses” in the
aether at work. Figure 3.3 is an artist-rendered
diagram of how the “magic number”
of 459 spherical atoms will pack together
to form a cuboctahedron-shaped cluster,
whereas 561 atoms will cluster into the
form of an icosahedron.
Figure 3.3 - Cuboctahedral
cluster of 459 atoms (L) and Icosahedral
cluster of 561 atoms (R)
Our next quote comes from
section 3 of Besley et al.’s study,
which discusses the “jellium”
model and makes it very clear that the
individual nature of the atoms in a microcluster
is lost in favor of a group behavior.
Again we will see the mentioning of magic
numbers and of electrons moving through
the entire structure instead of just through
their parent atom; we also see the hypothesis
that “geometric shells” of
electrons are somehow formed in the microcluster.
For small clusters of
simple metals, such as the alkali metals,
mass spectroscopic studies have indicated
the presence of preferred nuclearities
or “magic numbers” corresponding
to particularly intense peaks. These
experiments led to the development of
the (spherical) jellium model, wherein
the actual cluster geometry (i.e. the
nuclear coordinates) are unknown and
unimportant (perhaps because the clusters
are molten or rapidly fluxional) and
the cluster valence electrons are assumed
to move in a spherically average central
potential. The jellium model therefore
explains cluster magic numbers in terms
of the filling of cluster electronic
shells, which are analogous to the electronic
shells in atoms. For somewhat larger
nuclearities (N ~ 100-1500 [total atoms
in the cluster,]) there are periodic
oscillations in mass spectral peak intensities
which have been attributed to the bunching
together of electronic shells into supershells.
The observation of long
period oscillations in the intensities
of peaks in the mass spectra of very
large metal clusters (with up to 10^5
atoms) has led to the conclusion that
such clusters grow via the formation
of 3-dimensional geometric shells of
atoms and that for these nuclearities
it is the filling of geometric rather
than electronic shells that imparts
extra cluster stability.
Certainly, the idea of “supershells”
of electrons suggests a fluidlike blending
together of atoms in the quantum realm.
Again, it appears that the entire idea
of electrons is flawed, since the next
passage from Besley et al., tells us that
the “jellium” model where
“particle” electrons fill
up into “geometric shells”
does not work for what are known as transition
metals. Since there can be no individual
electrons at this point, Besley et al.
hypothesize the existence of “explicit
angular-dependent many-body forces.”
In short, a “fluid crystal”
aetheric quantum model is essentially
required to explain the forcesthat create
microclusters:
For transition metals
there is no clear evidence that the
jellium model holds, even for low nuclearities…
we would hope that a model which introduces
explicit angular-dependent many-body
forces (as in the MM [Murrell-Mottram]
model that we have adopted) will fare
better at explaining cluster structure
preferences.
As we think through the
results of these microcluster studies,
we must not forget that the Platonic Solids
are very easily formed by vibrating a
spherical area of fluid. It is quite surprising
that the microcluster researchers do not
appear to have noticed this connection.
The prevailing view of quantum mechanics
as a particle phenomenon has such a strong
hold on the minds of scientific researchers
that elaborate explanations involving
“geometric shells” of electrons
must be invoked. The key question that
must be addressed is how and why this
geometry would form – and the idea
of a vibrating, fluidlike quantum medium
is by far the simplest answer. A microcluster
is simply a larger “aetheric atom”
in a perfect geometric form.
3.5 DAVID HUDSON
AND “ORMUS ELEMENTS”
KNOWN
ORMUS ELEMENTS
|
| Element |
Atomic Number |
| Cobalt |
27 |
| Nickel |
28 |
| Copper |
29 |
| Ruthenium |
44 |
| Rhodium |
45 |
| Palladium |
46 |
| Silver |
47 |
| Osmium |
76 |
| Iridium |
77 |
| Platinum |
78 |
| Gold |
79 |
| Mercury |
80 |
Table 3.1 – Known
Metallic Microclusters or “Ormus”
Elements in David Hudson’s patent.
Next, we introduce the work
of David Hudson, who discovered a substance
that turned out to contain microclusters
in a goldmine on his property in the late
1970s. He spent several million dollars
having these mysterious materials analyzed
and tested in various ways, and in 1989
Hudson patented his microcluster discovery
by naming them Orbitally Rearranged Monatomic
Elements, or “ORMEs.” [The
name is usually changed to “Ormus”
or “M-state” elements when
discussed online so as not to interfere
with Hudson’s copyrights.] Hudson
displays a broad knowledge of microcluster
physics in his published lectures from
the early 1990s, but his findings are
more controversial than what we find in
Sugano et al.’s textbook or other
published mainstream sources. Hudson’s
patent focuses on the microcluster structures
he found in the following precious metal
elements. (We should note here that Sugano
and Koizumi have established that microclusters
have been found in non-metallic elements
as well.)
Hudson found that all of
the above microcluster metals exist plentifully
in sea water. Even more surprisingly,
Hudson discovered that these elements
in the microcluster state may be up to
10,000 times more abundant on Earth than
in their common metallic state. Hudson’s
research demonstrated that these metallic
microclusters are found throughout many
different biological systems, including
many different plants, and that they form
up to 5% of the material in a calf’s
brain by weight. Furthermore, they act
as room-temperature superconductors, have
superfluid qualities and levitate in the
presence of magnetic fields, since no
magnetic energy is able to penetrate through
their outer shells. Their physical qualities
match the descriptions of various materials
in alchemical traditions from China, India,
Persia and Europe. Various people have
volunteered to ingest gold microclusters
or “monatomic gold,” and have
reported experiencing the same psychic
effects as the kundalini changes noted
in the Vedic scriptures of ancient India.
Even more controversial
are Hudson’s patented discoveries
surrounding the heating of iridium microclusters.
As the material is heated, its weight
is seen to increase by 300 percent or
more. Even more surprisingly, as microcluster
iridium is heated to 850 degrees Celsius,
the material disappears from physical
view and loses all of its weight. However,
when the temperature is again reduced,
the microcluster iridium will reappear
and regain most of its former weight.
In Hudson’s patent, he has a chart
that was generated by thermo-gravimetric
analysis that shows this effect in action.
The idea of a material gaining
weight, then spontaneously losing weight
and disappearing from all physical view
is no longer out of place when we combine
Kozyrev’s findings with Ginzburg’s
changes to conventional relativity equations
and Mishin and Aspden’s discoveries
of multiple densities of aether. In the
first chapter, Kozyrev showed how the
heating or cooling of an object can affect
its weight in subtle but measurable ways.
We also saw that these weight increases
and decreases occur in sudden “quantized”
bursts, not in a smooth, flowing fashion.
Dr. Vladimir Ginzburg suggested that an
object’s mass is converted into
pure field as it approaches the speed
of light, and Mishin and Aspden’s
data suggests that the mass is actually
moving into a higher density of aetheric
energy.
Thus, Hudson’s observed
and patented effects with microcluster
iridium provide the first major proof
in this volume for the idea that an object
can be completely displaced into a higher
density of aetheric energy. In the case
of microcluster iridium, it would seem
that the geometric structure of the microcluster
allows for heat energy to be harnessed
much more efficiently. This harnessing
of the vibrations of heat then creates
extreme resonance at a lower relative
temperature, bringing the internal vibrations
of the iridium past the speed of light.
(These internal vibrations may already
be relatively close to the speed of light
before such added resonance is introduced,
due to the speed at which aether flows
through the atomic “vortex”
of negative electron clouds and the positive
nucleus.) Then, when the threshold point
of light-speed is finally reached, the
aetheric energy of the iridium is displaced
into a higher density, thus causing it
to disappear from measurable view. When
the temperature is reduced, the iridium
again displaces back down into our own
density, since the pressure that was holding
it in the higher density has now been
eliminated.
3.6 ANOMALIES OF
CRYSTAL FORMATION
Now that we have covered
the anomalous area of microclusters, we
are ready to tackle the more conventionally
understood problems of crystal formation.
Common table salt is a perfect example
of how two different elements, sodium
and chloride, can bond together and form
a Platonic Solid geometry, in this case
the cube. Two hydrogen atoms and one oxygen
atom form together in the shape of a tetrahedron
to create the water molecule, (which is
not a crystal in the liquid state but
has a tetrahedral molecule,) and fluorite
crystals form the octahedron. Crystals
that form with these properties will maintain
the same orientation throughout themselves,
and are symmetrical. A more technical
description is that crystals are “solids
which have flat surfaces (facets) that
intersect at characteristic angles, and
are ordered at a microscopic level.”
Our key question to remember here would
be, “Why do spherical energy vortexes
end up joining together in these characteristic
geometric angles and patterns?”
The answer, of course, shall be found
in our understanding of the Platonic Solids
as “harmonic” energy structures
in the aether.
Glusker & Trueblood’s
classical definition for how crystals
are formed is that they are produced by:
…a regularly repeating
arrangement of atoms. Any crystal may
be regarded as being built up by the
continuing three-dimensional translational
repetition of some basic structural
pattern. [emphasis added]
The term “translation”
means that we rotate a specific object
by an exact number of degrees, such as
180, which would form a “two-fold”
crystal since there are two such translations
in a 360-degree circle. Thus, “translational
repetition” means that that the
basic structural element (atom or molecular
group of atoms) making up a crystal can
be rotated again and again in the same
way to form the repeated pattern. The
technical term for such a regular arrangement
of atoms is periodicity, which means that
a crystal is made up of “some basic
structural unit which repeats itself infinitely
in all directions, filling up all of space”
within itself. The same structure (atom
or group of atoms) keeps repeating in
the same, periodic way, hence the term
periodicity.
In this classical theory
of “periodic” crystal formation,
each atom retains its original size and
shape and does not affect any of the other
atoms except for those it is directly
bonded to.
It is important to realize
that the model of periodicity worked very
well in crystallography. Any type of crystal
that had been discovered could be analyzed
with this method, and the angles between
all of the facets could be predicted based
on simple geometric principles. Then in
1912, Max von Laue discovered a way to
use X-rays to illuminate the inner structure
of crystals, creating what is known as
a “diffraction diagram.” The
diagram appears as an arrangement of single
points of light on a black background.
This led to a whole science of X-ray crystallography
that was formalized by William H. and
William L. Bragg, where the points of
light are analyzed geometrically in relation
to each other in order to determine what
the structure of the true crystal actually
is. For seventy years after this technology
was developed, every diffraction diagram
that had ever been observed by mainstream
scientists fit the periodicity model perfectly,
which led to the inevitable and apparently
quite simple conclusion that all crystals
were an arrangement of single atoms as
structural units.
One of the periodicity model’s
most straightforward mathematical rules
is that a crystal can only have 2-, 3-,
4-, and 6-fold rotations (translations.)
In this model, if you have a crystal that
is indeed made of single atoms or molecules
in a repeating, periodic structure, the
crystal cannot have a five-fold rotation
or any rotation higher than 6. Atoms are
“supposed” to retain their
own individual point-like identities and
not merge with other atoms into a larger
whole. Nevertheless, in terms of pure
geometry, the dodecahedron has 5-fold
symmetry and the icosahedron has 5- and
10-fold symmetry. These Platonic Solids
fit all the requirements for symmetry
as outlined by Dr. Wolff earlier in this
chapter, but you simply cannot pack single
atoms together to make either of these
shapes. So again, the dodecahedron and
icosahedron have symmetry, but they do
not have periodicity as crystal formations.
Therefore, there was no provision in science
to believe that either of these forms
would appear as a molecular, crystalline
structure – it was “impossible.”
Or so they thought…
Now enter the infamous Roswell
crash. According to former Groom Lake
/ Area 51 employee Edgar Fouche, molecular
structures were found on the recovered
hardware that did not fit the conventional
model of crystalline periodicity. These
became known as “quasi-crystals,”
short for “quasi-periodic crystals.”
Both the icosahedron and dodecahedron
have appeared in these unique alloys.
Similar to microclusters but on a larger
level of size, these quasi-crystals were
discovered to have many strange properties,
such as extreme strength, extreme resistance
to heat and being non-conductive to electricity,
even if the metals involved in their creation
would normally act as conductors! (This
will be explained as we progress.) Unlike
microclusters, which only appear to be
able to be formed individually from “cluster
beams”, quasi-crystals can be grouped
together into usable alloys. Fouche states
the following on his website, with our
added emphasis:
I’ve held positions
within the USAF that required me to
have Top Secret and ‘Q’
Clearances and Top Secret-Crypto access
clearances…
In the mess hall at [the
top-secret] Groom [Lake facility,] I
heard words like Lorentz Forces, pulse
detonation, cyclotron radiation, quantum
flux transduction field generators,
quasi-crystal energy lens and EPR quantum
receivers. I was told that quasi-crystals
were the key to a whole new field of
propulsion and communication technologies.
To this day I’d
be hard pressed to explain to you the
unique electrical, optical and physical
properties of quasi-crystals and why
so much of the research is classified…
Fourteen years of quasi-crystal
research has established the existence
of a wealth of stable and meta-stable
quasi-crystals with five-, eight-, ten-
and twelve-fold symmetry, with strange
structures [such as the dodecahedron
and icosahedron] and interesting properties.
New tools had to be developed for the
study and description of these extraordinary
materials.
I’ve discovered
that the classified research has shown
that quasi-crystals are promising candidates
for high energy storage materials, metal
matrix components, thermal barriers,
exotic coatings, infrared sensors, high
power laser applications and electro-magnetics.
Some high strength alloys and surgical
tools are already on the market. [Note:
Wilcock was personally told in 1993
that Teflon and Kevlar are both reverse-engineered.]
One of the stories I was
told more than once was that one of
the crystal pairs used in the propulsion
of the Roswell crash was a Hydrogen
Crystal. Until recently, creating a
Hydrogen crystal was beyond the reach
of our scientific capabilities. That
has now changed. In one Top Secret Black
Program, under the DOE, a method to
produce hydrogen crystals was discovered,
[and] then manufacturing began in 1994.
The lattice of hydrogen
quasi-crystals, and another material
not named, formed the basis for the
plasma shield propulsion of the Roswell
craft and was an integral part of the
bio-chemically engineered vehicle. A
myriad of advanced crystallography undreamed
of by scientists were discovered by
the scientists and engineers who evaluated,
analyzed and attempted to reverse engineer
the technology presented with the Roswell
vehicle and eight more vehicles which
have crashed since then.
Arguably after 35 years
of secret research on the Roswell hardware,
those who had recovered these technologies
still had hundreds if not thousands of
unanswered questions about what they had
found, and it was deemed “safe”
to quietly introduce “quasi-crystals”
to the non-initiated scientific world.
There are now literally thousands of different
references to quasi-crystals on the Internet,
completely separate from any mention of
microclusters. (Not a single scientific
study that we have been able to find online
mentions both microclusters and quasi-crystals
in the same document.) Many of the quasi-crystal
references are from companies that are
government contractors, and it is very
easy to see that they are being studied
with widespread intensity. However, they
are almost never mentioned in the general
media, even though they present such a
unique challenge to our prevailing theories
of quantum physics. The research goes
on, but it is with a very subdued excitement.
Dan Schechtman was given
the honor / duty of having “discovered”
(or being allowed to re-discover) quasi-crystals
on April 8, 1982 with an Aluminum-Manganese
alloy (Al6Mn) that began in a molten liquid
state and was then cooled off very quickly.
Crystals in the shape of an icosahedron
were produced, as determined by the X-ray
diffraction diagram that was seen, similar
to the image below. Schechtman’s
data was not even published until November
1984! In the image to the right of Figure
3.4, we can clearly see a number of pentagons,
indicating the five-fold symmetry of the
icosahedron:
Figure
3.4 – The Icosahedron (L) and its
X-ray diffraction diagram
from a quasi-crystal formation (R).
As we said, with the advent
of quasi-crystals, both the dodecahedron
and icosahedron appear, along with other
unusual geometric forms, completing the
appearance of all five of the Platonic
Solids in the molecular realm in some
way. Both the dodecahedron and icosahedron
possess elements of five-fold symmetry
with their pentagonal structures. Figure
3.5, from An Pang Tsai of NRIM in Tsukuba,
Japan, shows an Aluminum-Copper-Iron quasi-crystal
alloy in the shape of a dodecahedron and
an Aluminum-Nickel-Cobalt alloy in the
shape of a decagonal (10-sided) prism:
Figure 3.5 – Dodecahedral
(L) and decagonal prism (R) quasi-crystals
created by An Pang Tsai of NRIM.
The problem here is that
you cannot create such crystals by using
single atoms bound together, yet as we
can see in the photographs, they are very
real. The key problem for scientists,
then, is how to explain and define the
process by which these crystals are forming.
According to A.L. Mackay, one of the ways
to include five-fold symmetry in a crystallographic
definition is “Abandonment of Atomicity:”
Fractal structures with
five-fold axes everywhere require that
atoms of finite size be abandoned. This
is not a rational assumption to the
crystallographers of the world, but
the mathematicians are free to explore
it. [emphasis added]
What this suggests is that
similar to microclusters, quasi-crystals
appear to not have individual atoms anymore,
but rather that the atoms have merged
into a unity throughout the entire crystal.
While this may seem impossible for crystallographers
to believe, it is actually among the simplest
of A.L. Mackay’s four potential
solutions to the problem, as it involves
simple three-dimensional geometry and
correlates with our microcluster observations.
Again, since the crystals are very real,
the only major hurdle to cross is our
fixation on the belief that atoms are
made of particles.
Another related example
is seen with the Bose-Einstein Condensate,
which was first theorized in 1925 by Albert
Einstein and Satyendranath Bose, and was
first demonstrated in a gas in 1995. In
short, a Bose-Einstein Condensate is a
large group of atoms that behaves as if
it were one single “particle,”
with each constituent atom appearing to
simultaneously occupy all of space and
all of time throughout the entire structure.
All the atoms are measured to vibrate
at the exact same frequency and travel
at the same speed, and all appear to be
located in the same area of space. Rigorously,
the various parts of the system act as
a unified whole, losing all signs of individuality.
It is this very property that is required
for a “superconductor” to
exist. (A superconductor is a substance
that conducts electricity with no loss
of current.)
Typically, the Bose-Einstein
condensate is only able to be formed at
extremely low temperatures. However, we
seem to be observing a similar process
occurring in microclusters and quasi-crystals,
where there is no longer a sense of individual
atomic identity. Interestingly, yet another
similar process is at work with laser
light, known as “coherent”
light. In the case of the laser, the entire
light beam behaves as if it were one single
“photon” in space and time
– there is no way to differentiate
individual photons in the laser beam.
It is interesting to note that lasers,
superconductors and quasi-crystals were
all found in recovered ET technologies
since the 1940s.
This obviously introduces
a whole new world of quantum physics to
the discussion table. In time, it appears
that quasi-crystals and Bose-Einstein
condensates will be much more widely used
and understood as examples of how we had
gone astray in our “particle”-based
quantum thinking. Furthermore, British
physicist Herbert Froehlich proposed in
the late 1960’s that living systems
frequently behave as Bose-Einstein condensates,
suggesting a larger-scale order that is
at work. We will discuss this in later
chapters that will deal with aetheric
biology.
Figure 3.6 – Dan
Winter’s reprint of Sir William
Crookes’ geometric Table of the
Elements.
Our next question concerns
the “electron clouds” that
have been seen in the atom. Both Rod Johnson
and Dan Winter have noted that the teardrop-shaped
“electron clouds” in the atom
will all fit perfectly together with the
faces of the Platonic Solids. Winter refers
to the electron clouds as “vortex
cones,” and Figure 3.6 is an unfortunately
illegible copy of the Periodic Table of
the Elements as originally devised by
Sir William Crookes, a well-known and
highly respected scientist from the early
20th century who later became an investigator
into the field of parapsychology. At the
bottom of the image, we see an illustration
of how the “vortex cones”
fit on each face of the Platonic Solids.
(It appears that a more
legible copy of Figure 3.5 may exist in
one of Winter’s earlier books. Some
of the element names can be made out when
viewing the image at full size, and the
others can be inferred by their position
relative to the known Periodic Table of
the Elements. The chart is obviously read
from the top down, and the first element
that is written out below the two circles
in the center is Helium, and the line
then moves to each successive element.
The scale to the left is a series of degree
measurements, beginning with 0 at the
top line and counting by units of 10°
for each line. The degree numbers written
in on the scale are 50, 100, 150, 200,
250, 300, 350 and 400. This appears to
indicate that Sir Crookes’ theory
involved set angular rotations or translations
of the elements in terms of their geometry
as we move from one element to the next.
We can see that the wave is mostly straight,
but at times there are “dips”
in the line that appear to correspond
to larger angular rotations that must
be made.)
If we think back to what
Dr. Aspden wrote about Platonic Solids
in the aether, he stated that they act
as “fluid crystals,” meaning
that they can behave as a solid and as
a liquid at the same time. Thus, once
we understand that electron clouds are
all being positioned by invisible Platonic
Solids, it becomes much easier to see
how crystals are being formed and even
how quasi-crystals could be made. There
are “nests” of Platonic Solids
in the atom, one solid for each major
sphere in the “nest”, just
as there are “nests” of electron
clouds at different levels of valence
that all co-exist. The Platonic Solids
form an energetic structure and framework
that the aetheric energy must flow through
as it rushes towards the low-pressure
positive center of the atom. Thus, we
see each face of the Solids acting as
a funnel that the flowing energy must
pass through, creating what Winter called
“vortex cones.”
With the necessary context
in place, Johnson’s concepts of
Platonic symmetry within the structure
of atoms and molecules in the next chapter
should not seem as strange to us now as
they would to most people. Given what
we have seen with the comprehensive research
that has gone on, especially with quasi-crystal
engineering, it appears that this information
is already in use by humanity in certain
circles.
REFERENCES:
- Aspden, Harold.
Energy
Science Tutorial #5. 1997.
- Crane, Oliver
et al. Central Oscillator and Space-Time
Quanta Medium. Universal Expert Publishers,
June 2000, English Edition. ISBN 3-9521259-2-X
- Duncan, Michael
A. and Rouvray, Dennis H. Microclusters.
Scientific American Magazine, December
1989.
- Fouche, Edgar.
Secret
Government Technology. Fouche Media
Associates, Copyright 1998/99.
- 5. Hudson, David.
(ORMUS
Elements) URL:
- 6. Kooiman, John.
TR-3B Antigravity
Physics Explained. 2000.
- 7. Mishin, A.M.
(Levels
of aetheric density)
- 8. Winter, Dan.
Braiding
DNA: Is Emotion the Weaver? 1999.
- 9. Wolff,
Milo. Exploring
the Physics of the Unknown Universe.
Technotran Press, Manhattan Beach, CA,
1990. ISBN 0-9627787-0-2.
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