X-Message-Number: 20991
From: 
Date: Tue, 28 Jan 2003 10:57:35 EST
Subject: Informations from dust

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You may want to read this as a japanese novel: Start at end!

Some time ago, I have introduced the idea of non-local fields. It seems the 
multi-linear object describing them have been discovered more than one time 
by different mathematicians. None published about it in science journals, 
because the idea was rejected from the science area, not because it was 
inconsistent, but because writting down each component with a pencil and a 
paper would take a large part of the professional life of a researcher. 

What you can't write is not science. That was one century ago, now there are 
powerful computers and a mathematical object with hundreds millions 
components is no more the limit. Latice modeling in both, theoretical physics 
and meteorology, uses simulations with even more elements and no one reject a 
weather forcast because it is computed in a way no one could write down in 
his life with pencil and paper.

When in France, Nikolas Tesla was told about that "nonscience" formula and 
its meaning. He was the first to prove it in one of his experiment nearly 
forgotten today. I think it is time to look again at that domain, 
particularly with the aim in mind to recover biological information. The 
equivalence formulas I have given between covariant derivative and non local 
structure is for discontinuous (countable) elements. It contains both right 
and left handed derivative terms. A coutinuous version is possible by symetry 
breaking: A left handed only formula is produced by  taking all right handed 
indice, moving them up (respectively down) using the same letter, making the 
tensor product between the up and down and summing up. We have to do that too 
for 2 single differential indice of the left kind so as to let only second 
order derivative. I don't give here more details, such formulas are difficult 
to write in plain text form and seem not be interesting for most readers.

I understand that seems dry and it is difficult to see at what reality it 
refert. So let me give you an example: Sometime, after a strong storm, clouds 
dissipate fairly fast. At night, you are left with a stary sky. You can then 
see on a large patch of the sky a diffuse light coming from nowhere, the 
phenomenon is known under the name of noctilucent clouds. This is not clouds 
at all, simply high altitude chemical fluorescence comming from long range 
induced chemical reactions catalysed by non local Van der Waals force field. 
The maths can be intractable without a computer, but the physical effect is 
here.

Life systems are chemical, coordinated assembly, that is, coordinated atom 
scale electromagnetic processes. From unified electroweak theory it follows 
that there is a weak force part defined by Weinberg's angle. Weak force is 
described by the gauge group symetry SU(2), one of the two dimensional Lie's 
groups. I skip the maths, but there is a way to go to these other groups 
using a topological process called eversion.
These isomeric SU(2) groups would manifest at even smaller scale than SU(2) 
itself (superweak forces) and would be strongly shielded from outside 
perturbations. That would give them a very long life. Once more I skip the 
maths, they would decay by nonlocal field processes and inversely could be 
influenced by such fields. The coordinated activity of life would be such a 
field in that setting.

Life activity could so become engraved in these fields in a van der 
Waals-like structure. It could be recovered by nonlocal van der Waals 
electromagnetism. What that means in practice? Assume we take a bunch of 
photons with wavelenght L, for example L= 1 foot. We pass them between two 
face to face mirrors so they become entangled and act as a single quantum 
wave with the energy of all photons. If that energy is sufficient to get to 
the scale of the 2-d Lie's field, it will interact with it. You can think of 
that interaction as something able to glue to a sphere 1/ 100 000 000 000 000 
000 000 th of a inch in radius and turn it into a sea urchin-like object with 
spikes one foot long or so. This is a very unstable configuration and it 
would disintegrate into a non local field one foot in radius. If we can map 
it, we can recover the information stored in the original field.

The mathematical theory is staggering, but the practical application needs 
only a radio wave generator and two interferometric mirrors produced in a 
tick photographic emulsion similar to the ones used in physics to register 
the tracks of cosmic ray particles.

Yvan Bozzonetti.

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