An Explantion of Hubble Redshift due to the Global Non-Holon

Модератор: mike@in-russia

J.F.

An Explantion of Hubble Redshift due to the Global Non-Holon

An Explantion of Hubble Redshift due to the Global Non-Holonomity of Space.
http://www.ptep-online.com/index_files/ ... -16-L1.PDF
January, 2009 PROGRESS IN PHYSICS Volume 1
LETTERS TO PROGRESS IN PHYSICS
An Explantion of Hubble Redshift due to the Global
Non-Holonomity of Space
Dmitri Rabounski
E-mail: rabounski@ptep-online.com
In General Relativity, the change of the energy of a freely moving photon should be
the solution to the scalar equation of the isotropic geodesic equations, which manifests
the work produced on the photon being moved along the path. I solved the equation
in terms of physical observables (Zelmanov, Physics Doklady, 1956, v. 1, 227?230),
and in the large scale approximation, i.e. with gravitation and deformation neglected in
the space, while supposing the isotropic space to be globally non-holonomic (the time
lines are non-orthogonal to the spatial section, a condition manifested by the rotation of
the space). The solution is E =E0 exp(&#56256;&#56320;
2at=c), where
is the angular velocity of
the space (it meets the Hubble constant H0 =c=a=2:310&#56256;&#56320;18 s&#56256;&#56320;1), a is the radius of
the Universe, t=r=c is the time of the photon?s travel. So a photon loses energy with
distance due to the work against the field of the space non-holonomity. According to the
solution, the redshift should be z = exp(H0 r=c)&#56256;&#56320;1H0 r=c. This solution explains
both the redshift z =H0 r=c observed at small distances and the non-linearity of the
empirical Hubble law due to the exponent (at large r). The ultimate redshift, according
to the theory, should be z = exp()&#56256;&#56320;1=22:14.