On Feb 27, 7:21 am, "galathaea" wrote:
[ the following was rejected from sci.physics.foundations
for attempting to overstimulate interdisciplinary debate
through excessive cross-posting ]
notice also that this formulation is automatically affine
which appears to be a fundamental character of natural law
but must be derived in pointful formulations of space
i have learned that to be an effective usenet crank
one must have a crackpot theory of space to defend
whether mike gordge or henri wilson
or any of those fighting for or against various continua
or jack sarfatti evangelising the interesting models
connecting the zero-point to inertia and gravity
or robert israel on euclidean dynamics
( though of course not with the same existential commitments )
every name is throwing their hat in the ring
so i have decided to destroy all remnants of credibility
( meagre as they may be )
and describe some ideas on space i have toyed with over the years
when i first studied relativity
i became very impressed by the writings of ernst mach
i enjoyed the way he related properties of space
to properties of interaction
but both berkeleyan immaterialism
and einsteinian relativity
seemed to fall short of the machian interactionism
in particular in their notions of space
i began to think that models of space should know only
distance between two existents
that there was no good way to define a space of possible points
without introducing counterfactual existents
and other nonoperational existents
space could only be defined
in terms of properties on collections of existents
and i started simply with two-point distance relations
the observation that at the time "cinched" the model for me
was that none of the known forces had angular dependence
except in the presence of 3 or more particles
(and their higher multipole terms)
that all known forces decompose
to interactions between existents
models of space should be in the language of networks
with the edges of the interaction graph
colored by distances and other "interaction intensities"
to start
i used simple distance pairs
d , d , d , ...
12 13 23
for existents
e , e , e , ...
1 2 3
so that a succession of cases could present themselves for analysis
now i was drawn to first find a formulation
that would recapitulate the euclidean / galilean dynamics
so that i could understand better the translation
to this language of space
1 existent models
have no interactions and no notion of distance of pairs
they are very lonely and boring
2 existent models
can define d
12
there are several natural dynamics that i have studied here
but in general any H(d ) = C provides a dynamic
12
if
d = constant
12
this describes a completely correlated and combined state
there is no change with time
and we can see that if we map this to euclidean
we see the natural appearance of circles in this model
in particular
this model only has derived notions of angular arrangement
but not one innate to the two-point description
now if both existents are "inertial"
and i translate in the euclidean model
whose dynamics i want to emulate
i see a point and a line of locations for the other existent
d will decrease to a minumum and then increase
12
the constant of integration
can be taken as that minimum distance d
mu
and focus on the perpendicular d as the initial condition
|_
then
2 2 2
d = d + ( d - v t )
12 mu |_ 2
2
2 d /\ (d ) = - 2 d v /\ t + O( (/\t) )
12 -- 12 |_ 2 -- --
or as the first "fundamental" equation
in this formulation:
.
d d = - d v
12 12 |_ 2
i felt at the time that this seemed to mesh
with the views of poincare on relativity
but i look at the equation now
and cannot quite see why
it is a very elegant conservation equation
in units of area per time
as also found in newtonian mechanics
or revilla's goldbach work
or in quantum black hole thermodynamics
these are beautiful units
there is more structure at 3-existents
here euclidean restriction actually inhibit possible space state
there are the triangle inequalities
d + d d
12 13 = 23
d + d d
12 23 = 13
d + d d
13 23 = 12
constraining possibilities and correlating the d_ij
now following out similar calculations to the two existent case
derived in a euclidean frame where e is stationary
1
http://i16.tinypic.com/3ywvbjk.jpght...om/2e4k86h.jpg
.
d d = - d v
12 12 2 mu alpha 2
.
d d = - d v
13 13 3 mu alpha 3
.
d d = [ ( x - x ) ( v - v ) +
23 23 2 alpha 3 alpha 2 x 3 x
( y - y ) ( v - v ) ]
2 alpha 3 alpha 2 y 3 y
an important point about these formulations
is that the constants on the right side are just constants
call them C
simple conservation symmetries
and the values from the euclidean ontology
simply one way to name the relationships between constants
from here on the generalisation is just repetition
but the structure is lain
for complete graphs
distances form a traceless symmetric matrix D(t)
0 d d d d d d d ...
12 13 14 15 16 17 18
d 0 d d d d d d ...
12 23 24 25 26 27 28
d d 0 d d d d d ...
13 23 34 35 36 37 38
d d d 0 d d d d ...
14 24 34 45 46 47 48
d d d d 0 d d d ...
15 25 35 45 56 57 58
d d d d d 0 d d ...
16 26 36 46 56 67 68
d d d d d d 0 d ...
17 27 37 47 57 67 78
d d d d d d d 0 ...
18 28 38 48 58 68 78
. . . . . . . .
. . . . . . . .
. . . . . . . .
the dynamics of this matrix
conserve constants element-wise
and thus completely decomposes in the inertial case
but of course
to me
the point was always secretly
to relax and generalise these conditions
noneuclidean spaces
nonmanifold spaces
strange topologies with exotic (un-"real") metrics
distance distributions and stochastic interpretations
discretisations are obvious
and seem to naturally describe petri nets
and other models for a linear logic or pi calculus
i used to think about possibilities
like interpreting quantum mechanics
in "inconsistent" distance sets
but later when i read fotini markopoulou
i would think about how this might be a model structure
on which to map "consistent geometries"
as a dual interpretation to consistent histories
it was a different approach
from connes' deformations into noncommutative spaces
and didn't quite seem to mesh with other physics foundations
yet it had all these nice theoretical properties
- machian
- interactionist
- does not platonise space
existents are not assigned point positions in a space
pairs of existents have a property distance
- dimensions, metrics, connectivity, etc.
all easily generalisable in this model
- provides the ontology necessary for the known interactions
so i would nurse these particular delusions
secretly feeding them by developing relativistic versions
(simple)
or trying to generalise to forms that were in some way quantum
( never could come up with anything intuitive
that i could derive anything with )
i would read loop quantum gravity papers
straining my eyes in this way i do
trying to find an interpretation in their algebra
because their language seemed so suggestively close
but
i haven't touched this in years
and most of it is in one of four boxes of papers
that i still need to go through and organise
because i have moved often over that time
and i have always felt slightly ashamed
and i never wanted to show anyone
because i was afraid of the type of insanity exposed
but i have seen the courage of the cranks on usenet
and in their spirit and in the fullest earnestness
i present the above outline
of the galathaean theory of space
it is a revolutionary theory
despite its lack of concrete testable prediction
like einstien's negation of the ether or preferred frame
for once my theory is appreciated
it will show present-day science for the sham it is
any hidebound reactionary or self-appointed defender of the orthodoxy
can challenge my theory with all their nazi zeal
but i will not be harmed
because i don't really care if it is "right" or not
its just a pastime i have had
that i wanted to finally share
according to
http://math.ucr.edu/home/baez/crackpot.html
you probably should not give any of this much time
-=-=-=-=-=-=-=-=-=-=-=-=-=-=-=-=-=-=-=-=-
galathaea: prankster, fablist, magician, liar