Armenian Theory of Special Relativity (Illustrated) Robert Nazaryan 1 and Haik Nazaryan 2

Transcription

1 29606 Robert Nazaryan Haik Nazaryan/ Elixir Nulear & Radiation Phys. 78 (205) Available online at (Elixir International Journal) Nulear Radiation Physis Elixir Nulear & Radiation Phys. 78 (205) Armenian Theory of Speial Relativity (Illustrated) Robert Nazaryan Haik Nazaryan 2 Department of Physis, Yerevan state university, Yerevan 0025, Armenia. 2 Department of Physis Astronomy, California State University, Northridge, USA. ARTICLE INF O Artile history: Reeived: 9 November 204; Reeived in revised form: 2 Deember 204; Aepted: 2 January 205; Keywords Armenian Relativity, Lorentz Relativity, Relativisti, Transformations, Kinematis, Dynamis, Free Energy, Dark Energy. ABSTRACT The aim of this urrent artile is to illustrate in detail Armenian relativisti formulas ompare them with Lorentz relativisti formulas so that readers an easily differentiate these two theories visualize how general rih our Armenian Theory of Speial Relativity really is with a spetaular build in asymmetry. Then we are going behind this omparison illustrating that build in asymmetry inside Armenian Theory of Speial Relativity is reinarnating the aether as a universal referene medium, whih is not ontrary to relativity theory. We mathematially prove the existene of aether we show how to extrat infinite energy from the time-spae or sub-atomi aether medium. Our theory explains all these fats peaefully brings together followers of absolute aether theory, relativisti aether theory or followers of dark matter theory. We also mention that the absolute aether medium has a very omplex geometri harater, whih has never been seen before. We are explaining why NASA's earlier "BPP" DARPA's "Casimir Effet Enhanement" programs failed. We are also stating that the time is right to reopen NASA's BPP program fuel the spaerafts using the everywhere existing aether asymmetri momentum fore. 205 Elixir All rights reserved. Introdution First of all we appreiate the fat that our artile "Armenian Theory of Speial Relativity" eventually was published in two magazines, who found it important enough to deliver our new revolutionary ideas in physis to the sientifi ommunity.. Inaugural Issue of IJRSTP (International Journal of Reiproal Symmetry Theoretial Physis), volume, number (April- 204), by Asian Business Consortium Researh House ABC. 2. "Infinite Energy" magazine on the histori5-th anniversary of old fusion onferene, volume 20, issue 5 (May-204), by New Energy Foundation. The magazine of new energy siene tehnology. These two magazines provides a forum of debate for frontier siene that's why our artile "Armenian Theory of Speial Relativity" has been published in its proper plaes where sientists an disuss new derived generalized Lorentz-Poinare relativisti theory with new amazing relativisti formulas find a way to harness infinite energy from time-spae ontinuum or more preisely from the anther as a hidden sub-quantum medium. The aim of this urrent artile is to illustrate in detail Armenian relativisti formulas ompare them with Lorentz relativisti formulas so that readers an easily differentiate these two theories visualize how general rih our Armenian Theory of Speial Relativity really is with a spetaular build in asymmetry. It is worth to mention also that Lorentz transformation equations all other Lorentz relativisti formulas an be obtained from the Armenian Theory of Speial Relativity as a partiular ase, by substituting s 0 g. NASA's earlier program (between years) alled "Breakthrough Propulsion Physis" failed beause they didn't have orret relativisti formulas. The same happened with DARPA's "Casimir Effet Enhanement program" when trying to harness the Casimir fore in a vauum using that energy to power a propulsion system. They didn't sueed either beause of the same reason - they did not have orret quantum mehanis theory equations. The time is right to reopen NASA's BPP program, but this time using our everywhere existing aether momentum fore. Tele: addresses: robert@armeniantheory.om 205 Elixir All rights reserved

2 29607 Robert Nazaryan Haik Nazaryan/ Elixir Nulear & Radiation Phys. 78 (205) In our humble opinion, using Armenian Theory of Speial Relativity it's promising relativisti formulas - all that work an be done within two to three years, whih will bring forth the dawn of a new tehnologial era. That's why It is our pleasure to inform the sientifi ommunity at large, that in our main researh-manusript we have sueeded to build a mathematially solid theory of speial relativity in one dimensional spae derive new transformation equations many other new fasinating relativisti formulas, whih are an unambiguous generalization of the Lorentz transformation equations all other Lorentz relativisti formulas. Our artile is the aumulation of all efforts from mathematiians physiists to build a more general transformation equations of relativity in one dimension. Our published manusript reates a paradigm for advane studies in relativisti kinematis dynamis. The rown jewel of the Armenian Theory of Speial Relativity is Armenian energy momentum formulas, whih the world has never seen before. Our Armenian theory has unpreditable appliations in applied physis. Suh as, by manipulating the time-spae numerial onstants s g (partiularly in hemial or in thermal environment) we an obtain numerous mind blowing pratial results, inluding a theoretial pointer of how to harness infinite energy from time-spae ontinuum how to use rest partile asymmetri momentum formula to do it. Our manusript would be of interest to a broad readership inluding those who are interested in theoretial aspets of teleportation, time travel, antigravitation, free energy muh more... The time has ome to reinarnate the aether as a universal referene medium whih is not ontrary to relativity theory, beause for aether inertial system the asymmetri oeffiient just equals zero s 0. And our theory explains all these fats peaefully brings together followers of absolute aether theory, relativisti aether theory or followers of dark matter theory. We just need to mention that the absolute aether medium has a very omplex geometri harater, whih has never been seen before. Armenian Theory of Relativity differs from all other old fusion researhers theories by not onstruting some artifiial formulas to explain the innumerous infinite energy experimental results. We instead sueeded on building a beautiful theory of relativity (in one dimension) aordingly reeived many very important new formulas. Finally we mathematially proved the existene of universal aether inertial system Armenian relativisti formulas need to guide all bright experimentators on the journey of how to extrat infinite energy from the time-spae or sub-atomi aether medium. The time is right to say that 00 years of inquisition in physis is now over Aether Energy Age has begun! Legend of the Used Symbols Fundamental physial quantities t time oordinate notation x spae oordinate notation & general salar quantity notation A general vetor quantity notation m Ð0 m L0 Armenian Lorentz rest masses m m masses of the moving partile Diret reiproal relative veloity notations v veloity K inertial system respet to the K inertial system v veloity K inertial system respet to the K inertial system u veloity K inertial system respet to the K inertial system u veloity K inertial system respet to the K inertial system w veloity K inertial system respet to the K inertial system w veloity K inertial system respet to the K inertial system

3 29608 Robert Nazaryan Haik Nazaryan/ Elixir Nulear & Radiation Phys. 78 (205) Aeleration notations a, a Ð a L aelerations of the partile in the K inertial system b, b Ð b L aelerations of the partile in the K inertial system Derived physial quantities L E L P Ð P L F Ð F L Armenian Lorentz Lagrangian notations Armenian Lorentz energy notations Armenian Lorentz momentum notations Armenian Lorentz fore notations E G P G Galilean energy momentum notations Ð L Armenian Lorentz transformation matrixes h Ð h L Armenian Lorentz mirroring matrixes Mirror refletion notations for physial quantities a, t x w w & A mirror refletion of the time quantity t mirror refletion of the spae quantity x mirror veloity equals reiproal veloity mirror refletion of the salar quantity & mirror refletion of the vetor quantity A a Ð a L mirror refletions of the aelerations a, a Ð a L F Ð F L mirror refletions of the fores F Ð F L E L mirror refletions of the energies E L P Ð P L mirror refletions of the momentums P Ð P L Comparison Armenian Lorentz Relativisti Formulas Time-Spae Mirror Transformation Equations 2 t t sx x x t t x x Time-Spae Transformation Equations Between Moving Inertial Systems 4 Diret transformations t v s v x v x vt t v x t L v t v x x L v x vt

4 29609 Robert Nazaryan Haik Nazaryan/ Elixir Nulear & Radiation Phys. 78 (205) Inverse transformations t v s v x v x v t t v x t L x L v t v x v x v t General Salar-Vetor &,A Mirror Transformation Equations & & sa A A & & A A General Salar-Vetor &,A Transformation Equations Between Moving Inertial Systems Diret transformations & v s v & v A A v A v & & L v & v A A L v A v & Inverse transformations & v s v A v A v & & v A & L A L v & v A v A v & Mirror Transformation Matrixes Armenian mirroring matrix ÑÐ s 0 Lorentz mirroring matrix Ñ L 0 0 General Salar-Vetor &,A Relative Movement Transformation Matrixes Armenian transformation matrix Lorentz transformation matrix Ð v s v g v v g v v v s v L L v v v

5 2960 Robert Nazaryan Haik Nazaryan/ Elixir Nulear & Radiation Phys. 78 (205) Relation Between Reiproal Diret Relative Veloities 5 Armenian relations v v s v v v s v Lorentz relation v v For both relations in 4 true the following transformation: v v Gamma Funtion Formulas 6 Armenian gamma funtions Lorentz gamma funtion v v s v v2 s v v L v L v v2 0 Gamma Funtions Properties 7 Armenian properties v v v v v v s v v 2 s v 0 v 2 s v Lorentz properties v L v v L v L v L v 0 Invariant Interval Formulas 8 Armenian interval formula» 2 t 2 s t x x 2 t 2 s t x x 2 0 Lorentz interval formula» 2 t 2 x 2 t 2 x 2 0 Addition of Veloities Gamma Funtion Transformations 0 w u v u v s vu g vu w v u g vu w u v u v vu L w L v L u vu

6 296 Robert Nazaryan Haik Nazaryan/ Elixir Nulear & Radiation Phys. 78 (205) Subtration of Veloities Gamma Funtion Transformations 0 w v u w v s v vw u v w s v vw u w v w v vw L u L v L w vw Time Length Changes Respet K Inertial System 9 Armenian hanges Lorentz hanges t v t 0 s v t 0 v2 t L v t 0 t 0 v2 l l 0 v l 0 s v v2 l l 0 L v l 0 v2 Time Length Changes Respet K Inertial System 9 Armenian hanges Lorentz hanges t v t 0 t 0 s v v 2 t L v t 0 t 0 v2 l l 0 v l 0 s v v 2 l l 0 L v l 0 v2 Surpluses (Residues) of the Time Length Changes Armenian surpluses t Ð t t s v v t s t l Ð l l s v l s v l Lorentz surpluses t L 0 l L 0 Aelerations Mirror Transformation Equations Lorentz transformation a a s w s w 3 3 a a a a

7 2962 Robert Nazaryan Haik Nazaryan/ Elixir Nulear & Radiation Phys. 78 (205) Aeleration Transformation Equations Between Moving Inertial Systems 6 b a 3 v s v 3 v g vu vw 3 a 3 b b a L 3 v vw L 3 v vu 3 a 3 b New Aelerations Definitions 7 Armenian aelerations a Ð 3 w a 3 u b a Ð 3 w a 3 u b Lorentz aelerations a L L 3 w a L 3 u b a L L 3 w a L 3 u b New Aelerations Properties Armenian properties a Ð a Ð a Ð a Ð Lorentz properties a L a L a L a L Lagrangian Funtions For Free Moving Partile 8 Armenian Lagrangian Lorentz Lagrangian w s w w2 L w w2 Lagrangian Funtions Mirror Transformation Equations w Ð w s w w w s w L w L w L w L w Lagrangian Funtion Transformation Equations Between Moving Inertial Systems Armenian Transformations Lorentz Transformations u s v s v v2 vw w L u v2 vw L w w s v v2 g vu u L w v2 vu L u

8 2963 Robert Nazaryan Haik Nazaryan/ Elixir Nulear & Radiation Phys. 78 (205) Free Moving Partile Energy Momentum Formulas 9 (The Crown Jewel of the Armenian Theory of Relativity) Armenian formulas Lorentz formulas w P Ð w 2 s w s w w2 g w 2 s s w w2 E L w P L w w2 w2 w Energy Momentum Transformation Equations Between Moving Inertial Systems 24 Diret transformations E Ð v vp Ð P Ð v s v P v Ð E 2 Ð Lorentz Transformations E L L v E L vp L P L L v P L v E L Inverse Transformations v v P Ð P Ð v s v P Ð v E 2 Ð Lorentz Transformations E L L v E L vp L P L L v P L v E L Invariant (or Full) Energy-Momentum Formulas 25 Armenian invariant energy-momentum formula P Ð 2 spð 2 P 2 E sp Ð Ð Ð 2 g 4 s2 2 0 Lorentz invariant energy-momentum formula E L 2 PL 2 E L 2 P L Energy Momentum Mirror Refletion Formulas Armenian formulas P Ð P Ð s Lorentz formulas E L P L E L P L 0 Time length hange formulas in 2 22 was derived in our manusript, therefore they're orret. We have not yet sueeded in deriving the orret formula for representing a moving partiles mass hange, therefore we need to deide whih formula

9 2964 Robert Nazaryan Haik Nazaryan/ Elixir Nulear & Radiation Phys. 78 (205) of mass hange is a more proper hoie, until we find the way to derive it or make an experiment to find the right formula. There are three logial hoies: first hoie is to go the legay relativity way the other two hoies follows diretly from the Armenian energy momentum formulas. All those three hoies an be seen below: Legay relativity way m w 2 m m 3 P Ð mw m P Ð w w 2 s w w g w 2 s w We need to analyze these three hoies separately then alulate the mass surpluses for these three ases. For legay relativity, all these three ases oinide with eah other therefore, there is no ontradition at all. Mass Changes Respet K K Inertial Systems 9 ) First hoie Armenian hanges of the moving mass Lorentz hanges of the moving mass m w m w s w w2 s w w 2 m L w m L w w2 w2 Surpluses of the mass for this ase Armenian surplus Lorentz surplus m Ð m m s w ) Seond hoie m s w m m L m m 0 Armenian hanges of the moving mass Lorentz hanges of the moving mass m w 2 s w m w 2 s w 2 s w s w w2 2 s w s w w 2 m L w w2 m L w w2 Surpluses of the mass hanges for this ase Armenian surplus Lorentz surplus m Ð m m 0 m L m m 0

10 2965 Robert Nazaryan Haik Nazaryan/ Elixir Nulear & Radiation Phys. 78 (205) ) Third hoie Armenian hanges of the moving mass Lorentz hanges of the moving mass m w g w 2 s w m w g w 2 s w w s w g w 2 s w2 w g w 2 s w w 2 m L w w2 m L w w2 Surpluses of the mass hanges for this ase Armenian surplus Lorentz surplus m Ð m m w s w 2 s 2 s2 g w w m L m m 0 The mass of the moving partile is not an important quantity anymore. The more important quantity beomes the partile's rest mass whih has a real physial meaning. In Armenian Theory of Speial Relativity we also define a new rest mass quantity, whih is more general an also have a negative value as well, just like a partile's harge. Rest Mass Formulas 2 Armenian rest mass Lorentz rest mass m Ð0 g 4 s2 0 m L0 0 Fore Formulas 26 Armenian fore formula Lorentz fore formula F Ð g 4 s2 3 Ð w a m Ð0 a Ð F Ð g 4 s2 3 w a m að Ð0 F L L 3 w a a L F L L 3 w a a L Fore Transformation Formulas Between Moving Inertial Systems 27 Preserved Newton s laws Armenian formulas Lorentz formulas Newton s seond law Newton s third law F Ð F Ð F Ð F Ð F L F L F L F L Rest Partile Energy Momentum Formulas Progress Chronile 22 Galilean formulas Lorentz formulas Armenian formulas E G 0 0 P G 0 0 E L 0 P L P Ð 0 2 s - This rest partile energy formula gives us nulear power.

11 2966 Robert Nazaryan Haik Nazaryan/ Elixir Nulear & Radiation Phys. 78 (205) This rest partile momentum formula is the Armenium formula - gift to humanity as a lean free energy soure. Range of Veloities of Moving Partile in the Armenian Theory of Relativity 3,4,5 g \ s s 0 s 0 s 0 g 0 0 w w 0 0 w g 0 w w 0 g 0 0 w s 0 w 0 w 0 g s 2 0 w 2 s 0 w 0 w g s 2 0 w 2 s 0 w 0 w Conlusions As you an see from the above omparisons of Armenian Lorentz relativisti formulas, Armenian relativisti formulas is full of asymmetry, whih is in every single formula beause of oeffiient asymmetry s that asymmetry is the essene exiting part of the Armenian Theory of Relativity. Therefore we define a br new geometrial spae - Armenian Spae to satisfy Armenian Theory of Speial Relativity, with very strange properties in three dimensions, suh as: i i i i i i s i Let's start analyzing the rown jewel of the Armenian Theory of Relativity - the Armenian energy momentum formulas 3. Then we find out that the free moving partile with veloity w in the inertial system K has the following three extreme situations: moving partile s veloity equals zero w 0 2 moving partile s energy equals zero w 0 3 moving partile s momentum equals zero P Ð w 0 For these three ases 50 the partile has different veloities aordingly, using 6, we have three different values of Armenian gamma funtion as shown below: w w 2 s w w 3 w 2 s 2 g 4 s2 s g w 2 w 2 4 s 2 g Therefore using the veloity Armenian gamma funtion values given by 5, we an obtain from 3 the partile's Armenian energy momentum values for these three extreme ases: 0 P Ð 0 2 s 2 w 0 P Ð w g 4 s2 3 w 2 4 s 2 g P Ð w 2 0

12 2967 Robert Nazaryan Haik Nazaryan/ Elixir Nulear & Radiation Phys. 78 (205) How an we explain all of these strange results, whih is unthinkable from the legay physis point of view? What is really the physial meanings of the following three ases? When a partile is resting in the inertial system K w 0, but partile still has a momentum. 2 When a partile is moving at veloity w with respet to the inertial system K, but it's energy equals zero. 3 When partile moves with respet to the inertial system K at veloity w 2, but this time it's momentum equal zero. Most physiists today would view all of these bizarre results - straight results of the Armenian Theory of Relativity, as omplete madness they will say that all these fats would bring the end of physis as we know it. Till now due to extreme dogmatism, the properties of time-spae asymmetry all physial quantities asymmetri transformations are never offiially studied. The role of symmetry violations in physis is not understood by physiists. That is where the Armenian Theory of Speial Relativity omes to play, whih explains all of these "impossible violations" brings to question all physial laws of legay hard siene dems a revision under these remarkable new irumstanes. For example, in the first ase - the veloity of the partile equals zero, whih means that the partile is at rest in the inertial system K, but the same partile still has momentum whih is dependent on oeffiient s. There is only one logial explanation - that there exists an aether medium that the aether is silently dragging the partile bak in the opposite diretion of the movement inertial system K. We an harness infinite energy from that rest partile's momentum just as we are harnessing energy from the wind using a windmill. In the same manner we an explain the third ase, but the seond ase is a bit of a hallenge. Referene [] R. Nazaryan H. Nazaryan, Armenian Theory of Speial Relativity, Uniprint, Yerevan 203 [2] R. Nazaryan H. Nazaryan, IJRSTP, Vol., Issue, Pages (204) [3] R. Nazaryan H. Nazaryan, Infinite Energy, Vol. 20, Issue 5, Pages (204)