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The Theory of Everything
By
Peter Glen
In
the quest for the 'Theory of Everything' we looked to the starts, we
looked into the realm of atoms. We looked into the very large and
the very small. Every time we looked for a different order of
magnitude, some or all of our theories got invalidated. All along this
quest, the answer was right in front of us.
The theory of everything based upon and consists of the
following fundamental
suppositions:
While those theories describe various aspects of the
'Theory of everything' , the sum of those suppositions amount to a
rather simple deduction:
'The universe IS the
superimposition of harmonic motions between two possible states."
'Theory of
Everything' Discussion:
On first reading, it seems too simple. But the
complexity arises from the 'superimposition' factor, and the
arbitrary nature of defining the 'two possible states'.
Two
possible states:
Let's expand on
the 'two possible states' part first. Earlier we referenced arbitrary
states, like day/night, winter/summer, full moon/new moon, expanding
galaxy/contacting galaxy. Note that the integration scope can be as
little as an atomic event, or as big a galactic event.
Harmonic motion:
Think of a pendulum. Swinging between two extremes, slowing,
stopping and reversing at the extremes. The mathematical definition of
the harmonic motion is defined by a rotating vector, and the X and Y
coordinates plotted.
The rotating vector has special properties, is that from any
particular perspective it is a.) symmetric, b.) the rate of
acceleration or deceleration is proportional to the distance to the
**endpoints. c.) the rate of rate of acceleration or
deceleration is proportional to the distance to the **endpoints.
(recursively)
**endpoints in this context is when any axis value maximizes and turns
around
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A plot of a real time signal
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Superimposition:
In our immediate universe, everything happens in
parallel. For instance, the beetles outside feast on leaves of the
trees, while we consume our breakfast. The moon orbits around the
earth, while the earth is on its merry way around the sun. And all of
that is in motion within our galaxy. The superimposition law states
that
all of the things that happen (and their effects thereof) in a
particular scope of integration is the sum of the individual smaller
scoped subsystems contained within (and their effects thereof).
'Theory of Everything' Practical implications:
An interesting impact of the 'Theory of Everything' is in
digital signal processing. One of the reasons traditional math has
difficulty dealing with real time signals (I suspect), is because the
approach yields a very complex output. To simplify things, we need to
define a new math for real time signals, just as we needed to define
new physics for the very large or the very small.
The 'Theory of Everything' [TOE] defines a new way
of thinking about the real time signals. Acknowledging the fact of the
compound harmonic motions, the states of the signal is analyzed,
picking various integration intervals. When we executed that, it
immediately yielded a simplification of the signal, in essence a
compression. On our first test, the compression factor exceeded current
state of the art (the currently deployed compression's) compression
factors, with minimal signal loss. At this point, DSP experts would
interject that, this is exactly what the 'Fourier Transform' does.
Indeed. But with the new TOE compression, there are no sidebands, no
artifacts, and the calculation is an order of magnitude simpler.
In our notation, voice recognition is a special kind
of compression. I believe, that the TOE and the mathematics associated
with it, is the foundation stone of the next generation of products and
applications dealing with real time signals.
As a side note of the practical implications, a voice
compression product is in the works based on the TOE compression for a
point to point voice communication product. At this stage of
development (aug 2007) we can confirm the transmission of a 44100/16
bit voice transmission in less bandwidth than the traditional
phone (POT) would need.
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