Armenian Theory of Relativity Letter

By using the principle of relativity (first postulate), together with new defined nature of the universal speed (our second postulate) and homogeneity of time-space our third postulate, we derive the most general transformation equations of relativity in one dimensional space. According to our new second postulate, the universal (not limited) speed c in Armenian Theory of Special Relativity is not the actual speed of light but it is the speed of time which is the same in all inertial systems. Our third postulate: the homogeneity of time-space is necessary to furnish linear transformation equations. We also state that there is no need to postulate the isotropy of time-space. Our article is the accumulation of all efforts from physicists to fix the Lorentz transformation equations and build correct and more general transformation equations of relativity which obey the rules of logic and fundamental group laws without internal philosophical and physical inconsistencies. *Corresponding author: Nazaryan R, Physics Department, Yerevan State University, Yerevan 0025, Armenia, Tel: 37410555240; E-mail: robert@armeniantheory.com Received August 11, 2014; Accepted August 19, 2015; Published August 29, 2015 Citation: Nazaryan R, Nazaryan H (2015) Armenian Theory of Relativity Letter. J Material Sci Eng 4: 199. doi:10.4172/2169-0022.1000199 Copyright: © 2015 Nazaryan R, et al. This is an open-access article distributed under the terms of the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original author and source are credited. Because of the first and third postulates (1), time and space transformations between two inertial systems are linear:


Introduction
On the basis of the previous works of different authors a sense of hope was developed that it is possible to build a general theory of Special Relativity without using light phenomena and its velocity as an invariant limited speed of nature [1][2][3][4][5]. The authors also explore the possibility to discard the postulate of isotropy time-space [1][2][3][4]. In the last five decades, physicists gave special attention and made numerous attempts to construct a theory of Special Relativity from more general considerations, using abstract and pure mathematical approaches rather than relying on so called experimental facts [6]. After many years of research we came to the conclusion that previous authors did not get satisfactory solutions and they failed to build the most general transformation equations of Special Relativity even in one dimensional space, because they did not properly define the universal invariant velocity and did not fully deploy the properties of anisotropic timespace. However, it is our pleasure to inform the scientific community that we have succeeded to build a mathematically solid theory which is an unambiguous generalization of Special Relativity in one dimensional space. The principle of relativity is the core of the theory relativity and it requires that the inverse time-space transformations between two inertial systems assume the same functional forms as the original (direct) transformations. The principle of homogeneity of time-space is also necessary to furnish linear time-space transformations respect to time and space [2,3,5]. There is also no need to use the principle of isotropy time-space, which is the key to our success. To build the most general theory of Special Relativity in one physical dimension, we use the following three postulates: 1. All physical laws have the same mathematical functional forms in all inertial systems. 2. There exists a universal, not limited and invariant boundary speed c, which is the speed of time.
3. In all ( ) inertial systems time and space are homogeneous Special Relativity .
Besides the postulates (1), for simplicity purposes we also need to use the following initial conditions as well: Because of the first and third postulates (1), time and space transformations between two inertial systems are linear:

Armenian Relativistic Kinematics
Using our postulates (1) with the initial conditions (2) and implementing them into the general form of transformation equations (3), we finally get the most general transformation equations in one physical dimension, which we call -Armenian transformation equations. Armenian transformation equations, contrary to the Lorentz transformation equations, has two new constants (s and g) which characterize anisotropy and homogeneity of time-space. Lorentz transformation equations and all other formulas can be obtained from the Armenian Theory of Special Relativity by substituting 0 s = and Armenian gamma functions for direct and reciprocal relative velocities, with Armenian subscript letter ℘, are: Relations between reciprocal and direct Armenian gamma functions are: Armenian invariant interval (we are using Armenian letter u ) has the following expression: Armenian formulas of time, length and mass changes in K and ′ Κ inertial systems are: Transformations formulas for velocities (addition and subtraction) and Armenian gamma functions are: If we in the K inertial system use the following notations for mirror reflection of time and space coordinates: The ranges of velocity w for the free moving particle, depending on the domains of time-space constants s and g, are Where w 0 is the fixed velocity value for g < 0, which equals to: Equation (13) shows that there exists four different and distinguished range of velocities (w) for free moving particle, which are produced by different domains of time-space constants s and g as shown below: Equation (15) shows us that each distinct domains of (s, g) timespace constants corresponds to its own unique range of velocities, so therefore we can suggest that each one of them represents one of the four fundamental forces of nature with different flavours (depending on domains of s).

Armenian Relativistic Dynamics
Armenian formulas for acceleration transformations between K′ and K inertial systems are: Armenian acceleration formula, which is invariant for given movement, we define as: Armenian relativistic Lagrangian function for free moving particle with velocity w is: Armenian relativistic energy and momentum formulas for free moving particle with velocity w are: From (26) it follows that Armenian force space components are also invariant: As we can see (15), we are a few steps away to construct a unified field theory, which can change the face of modern physics as we know it now. But the final stage of the construction will come after we finish the Armenian Theory of Special Relativity in three dimensions.