Armenian Transformation Equations
For Relativity
Hopar
100th Anniversary of the Special Relativity Theory
This Research done in Armenia 1968-1988, Translated from the
Armenian Manuscript
Yerevan State University (Armenia), Byurakan Astrophysical
Observatory (Armenia)
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Abstract
In our article, we derive a new transformation of relativity for inertial
systems using the following guidelines:
-
We use vector notations to obtain new transformation
equations in a general form.
-
In the process of deriving the general new transformation equations in vector
form, we keep the term
as well.
-
We add one more postulate to the existing two, to resolve
ambiguity problems in the orientation of the inertial coordinate systems axes.
-
Newly obtained transformation equations need to satisfy the linear
transformation fundamental laws.
-
Addition of velocities we calculate in two different ways: by linear
superposition and by differentiation, and they need to coincide each other. If
not, then we force them to match for obtaining the final
relation between coefficients.
After using the above mentioned general guidelines, we obtain straight and
inverse transformation equations named the Armenian transformation
equations and they are expressed in two notations: by absolute
relative velocity
and by local relative velocity
.
Armenian transformation equations are the replacement for the Lorentz
transformation equations.