Հայկական Տեսության Գիտական Հոդվածների Հրատարակման...

1 Ռոբերտ Նազարյան, 21 Փետրվարի 2015թ.

Հայաստանի Գիտությունների Ակադեմիայի

Ֆիզիկայի ամսագրում (AJP) տեղակայված

մեր հոդվածները (նույն հոդվածը երկու անգամ)

Ինչպես տեսնում եք վերևի մեղադրանք-լուսանկարից,

մենք առաջին անգամ մեր հոդվածը՝ «Միաչափ Գոյերի

Հարաբերական Շարժման Տեսություն - Ազատ Շարժում»,

հանձնել ենք այդ ամսագրին 21 Դեկտեմբերի 2012թ.ֈ

Երկու շաբաթ անցնելուց և ոչ մի պատասխան

չստանալուց հետո մենք որոշեցինք նույն հոդվածը

ուղարկել երկրորդ անգամ՝ 09 Հունվարի 2013թ.ֈ

Մենք անհանգստացած էինք մեր հոդվածի տպագրման

ճակատագրով և այդ պատճառով երկու անգամ դիմել ենք

(էլեկտրոնային նամակով) ամսագրի խմբագրությանը.

առաջին անգամ՝ 14 Հունվարի 2013թ.

երկրորդ անգամ՝ 19 Փետրվարի 2013թ.

Բայց ձայն բարաբառո յանապատիֈ

Երեք ու կես ամիս անցնելուց հետո միայն մենք ստացանք

պատասխան, որը կարելի է համարել հաստատումը այն

փաստի որ Հայերենը չի համարվում գիտական լեզուֈ

Բայց միթե այդ պատասխանը ստանալու համար պետք էր

սպասել այդքան երկար հարգելի խմբագիրֈ

Editor-in-Chief Professor Vladimir Aroutiounian

Academician of the National Academy of Sciences,

Yerevan State University (YSU), Republic of Armenia

phone/fax: +(37410) 555590

e-mail: [email protected], [email protected]


Ֆիզիկայի ամսագրի պատասխանը, որը

հակասում է Հայաստանի Սահմանադրությանը

Հայաստանի Գիտությունների Ակադեմիայի ֆիզիկայի

ամսագիրը մեզ պատասխանեց 03 Ապրիլի 2013թ.,

այսինքն մեր հոդվածը առաջին անգամ ուղարկելուց մոտ

երեք ու կես ամիս հետոֈ

Ահա այդ հակասահմանադրական պատասխանը.

« Item Return

Unfortunately your item Միաչափ Գոյերի Հարաբերական

Շարժման Տեսություն - Ազատ Շարժում could not be

accepted into Armenian Journal of Physics as-is.

Articles in English only can be accepted.

The item has been returned to your workspace. You may wish

to edit your item, fix the problem, and redeposit.»

Դե եկ վարդապետ ու մի խենթանաֈ

Եւ այդ անճարակների ամսագրի խմբագրությունը, միայն

երեք ու կես ամսից հետո կարողացավ պարզել այն

փաստ, որ մեր հոդվածը ոչ թե Անգլերեն է այլ՝ Հայերենֈ

Այսպիսի «տիեզերական» արագությամբ մեր Հայկական

գիտությունը ի՞նչ հորիզոններ կարող է նվաճելֈ Ողբամ

այդ գրանտակեր անկարողներին, որոնք նստած են

Հայաստանի գիտության ծերանոցում (ակադեմիայում) և

ոչ միայն հոշոտում են Հայկական գիտությունը, այլ հենց

դրա համար էլ ստանում են նաև ակադեմիական նպաստ

պատերազմի մեջ գտնվող Հայաստանի գանձարանիցֈ

Հայկական Տեսության Գիտական Հոդվածների

Հրատարակման Ճակատագիրը Հայաստանում

mailto:[email protected]


Մենք ուղարկեցինք մեր հոդվածի համառոտ տարբերակը

Անգլերեն (միայն կարևոր արդյունքները, 4էջ)

20 Ապրիլի 2013թ.

Դեղին գույնը նշանակում է որ մեր հոդվածը 03 Ապրիլի

2013թ. վերջնականապես մերժել են, իսկ մանիշակագույնը

նշանակում է որ մենք բարեհաջող 20 Ապրիլի 2013թ.

գրանցել ենք մեր հիմնական 86 էջանոց Հայերեն հոդվածի

միայն կարևոր արդյունքները Անգլերեն (4 էջ)ֈ

Վերևի մեղադրանք-նկարը մենք լուսանկարել ենք 22

Հուլիսի 2013թ., որտեղ դուք կարող եք տեսնել մեր յոթ

ամսվա ապարդյուն պայքարի արդյունքըֈ Ընդորում մեր

հոդվածը այդպես էլ երբեք չուղարկվեց գրախոսմանֈ

Հարց է առաջանում, արդյո՞ք Հայաստանը ունի

Գիտության Նախարարֈ Եթե այո, այդ դեպքում նա

տեղյակ է թե ի՞նչ է կատարվում մեր Ակադեմիայումֈ

Արդեն հույսս կտրել էի Հայկական AJP ամսագրից ու չէի

ստուգում և ահա դեկտեմբերի սկզբներին ես ստուգեցի և

տեսա որ նրանք դավադրաբար մեր հոդվածը ջնջել ենֈ

Մենք անմիջապես, 04 Դեկտեմբերի 2013թ., նորից

գրանցեցինք մեր հոդվածըֈ Այնուհետև նորից ու նորից

մենք գրանցեցինք 12 Դեկտեմբերի 2013թ., 22 Հունվարի

2014թ. և վերջապես 27 Ապրիլի 2014թ.ֈ Ակադեմիայի

տղաները ջնջում են՝ մենք նորից տեղադրում...

Վերևի մեղադրանք-նկարը մենք լուսանկարել ենք 17

Մայիսի 2014թ. և 20 Հունիսի 2014թ.ֈ Փաստորեն մեր մեկ

ու կես տարվա պայքարը՝ հրատարակվելու մեր Հայրենի

ֆիզիկայի գիտական ամսագրում մնաց անպատասխան և

մեր հոդվածը այդպես էլ երբեք չուղարկվեց գրախոսմանֈ

Եվրոպայի և ԱՄՆ-ի գիտական ամսագրերը մոտ երկու

շաբաթում որոշում են՝ մերժել թե ընթացք տալ հոդվածինֈ

Հրատարակման Համար Պայքարը Շարունակվում Է


Մենք կարողացանք պատրաստել նոր հոդված -

«Armenian Theory of Special Relativity Illustrated»

վերնագրով (Անգլերեն, 11 էջ) և նույնպես ուղարկեցինք

հրատարակման 21 Սեպտեմբերի 2014թ.ֈ

Հայաստանի Ակադեմիայի տղաները հոգնեցին ջնջելու

անպտուղ գործողություններից և լրիվ մատնվեցին

անգործունեությանֈ Իսկ մինչ այդ մենք գրեցինք մի նոր

հոդված ևս, որի մեղադրանք-նկարը կարող եք տեսնել աջ

կողմումֈ Ընդ որում ցավալին այն է որ մեր առաջին

հիմնարար Հայերեն հոդվածի (86 էջ) միայն արդյունքները

Անգլերեն (4 էջ), որը արդեն երկու տարուց ավել է

համառորեն հրաժարվում են տպագրել Հայաստանում,

տպագրվեց ԱՄՆ-ի «Infinite Energy» ամսագրի 2014թ.

Մայիսի համարում (Volume 20, Issue 115) 40-42 էջերումֈ

«Infinite Energy» ամսագրի շապիկը և 40-րդ էջըֈ

Մենք կարողացանք պատրաստել ևս մի նոր հոդված -

«Symmetry in Armenian Theory of Special Relativity»

վերնագրով (Անգլերեն, 17 էջ) և նույնպես ուղարկեցինք

այն հրատարակման 24 Դեկտեմբերի 2014թ.

Մենք վերոնշյալ հոդվածը գրել էինք երկու լեզվով՝

Հայերեն և Անգլերեն, բայց քանի որ ինչպես արդեն

տեղյակ եք Հայաստանի Ազգային Ակադեմիայի ֆիզիկայի

ամսագիրը (AJP) Հայերեն լեզուն համարում է ոչ

գիտական լեզու և արգելված է, այդ պատճառով մենք

ուղարկեցինք հրատարակման Անգլերեն տարբերակըֈ

Վերևի մեղադրանք-նկարը ես լուսանկարել եմ վերջերս՝

19 Փետրվարի 2015թ.ֈ Ինչպես տեսնում եք մեր երեք

տարբեր հոդվածները խեղճուկրակ վիճակում շարված են,

սպասելով իրենց ճակատագրին՝ լինել թե չլինելֈ

«Infinite Energy» ամսագրի 41-րդ և 42-րդ էջերըֈ




մաթեմատիկայի ամսագրում (AJM) տեղակայված

մեր առաջին հոդվածը, 29 Ապրիլի 2013թ.

Մոտ երկու ամիս հետո 19 Հունիսի 2013թ. մեր հոդվածը

ջնջեցին հետևյալ պատճառաբանությամբ. «Unfortunately

your item Armenian Theory of Special Relativity could not be

accepted into Armenian Journal of Mathematics as-is. Your

paper does not satisfy our conditions. It's more convenient to

send it to some physical journal for example Armenian Journal

of Physics. The item has been deleted.»ֈ Հետաքրքիր է որ

ֆիզիկոսները ասում են՝ մեր հոդվածը մաթեմատիկա է,

իսկ մաթեմատիկոսներն ասում են՝ դա ֆիզիկա էֈ

Այդ մերժումից մոտ ութ ամիս հետո մեր այդ նույն

հոդվածը նորից տեղադրեցինք 27 Փետրվարի 2014թ.ֈ

Նորից մոտ երկու ամիս հետո, 26 Ապրիլի 2014թ.,

մեր հոդվածը ջնջեցին նույն պատճառաբանությամբֈ

«The item has been returned to your workspace.»

Մենք մտածեցինք որ գուցե մեր այդ առաջին հոդվածը

սրտներովը չէ և այդ պատճառով, անմիջապես, մենք

տեղադրեցինք մեր նոր պատրաստված երկրորդ հոդվածը

10 Հուլիսի 2014թ.ֈ Մոտ երեք ամիս հետո, 17 Հոկտեմբերի

2014թ., մեր այդ երկրորդ հոդվածը նույնպես ջնջեցին նույն

պատճառաբանությամբ. «Unfortunately your item Armenian

Theory of Special Relativity Illustrated could not be accepted..»

Հայաստանի մաթեմատիկոս տղեքը մեր երկրորդ

հոդվածն էլ չսիրեցին, մնում է փորձել մեկ անգամ ևսֈ

Մեր երկու հոդվածները՝ 17 Հոկտեմբերի 2014թ. և

26 Դեկտեմբերի 2014թ., դեռ սպասում են տպագրմանֈ


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c t � c t � sx

x � � x (2-13)

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d t � 1 � s uc d t

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9 - 17

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10 - 17

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(2-23)

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11 - 17

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12 - 17

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13 - 17

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14 - 17

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15 - 17

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16 - 17

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.�� $ ��ژ �� 5�� 3�� (�� 5��

3�� 3�� 5��(� ��2�� $ 7#��(�� (��$6 5�(��, ��#L

�� ژ �� 5�� 3�� T

�� (�� 5�� 3�� P � Rx�

�� (�� 5�� 3�� TRx �� RxT

(.-1)

� - ��&�� (�� (�� ,��6 5�� $�ژ��5 > X �2��8$� ��(�� 5��,�� =

�#� �� 5�6�� 2�� ژ�� (�86��

��$�� 5��2( 8�8��9 5�� . � 1�-6 ��6�� 3��9 �� $ 3��, 5�(��, ��#L

�� (�� :�� T P � Rx TRx � RxT

��(�� 5��&�� 3��8� � �s s �s

��(�� (�� 3��8� � g g g

<�� #�(�5�� ژ � �t t � s 1c x � t � s 1

c x

<�� $� �2��8$��6� � x �x �x

<�� *��36�� m m m

<�� ژ�� 3�� u �u

1 � s uc

u1 � s u

c

<�� 3�8�� a � 1

1 � s uc

3a � 1

1 � s uc

3a

<�� c�3ژ�� 1 � s u

c

�1 � s u

c<�� >��3�� E E E

<�� 3�� P �P � s 1c E P � s 1

c E

<�� 6�� *� �� ژ� � F �F �F

(.-2)

F�&#�� $ �� $ (��, �� . � 2�-6 (�6�� 89 �� &�

#�5#��6�� 6�� $�� 5��,�� 5��&�� 5�(��= m�: � ��

�� 5�6�� &��9 ��8 �� 2 &� �� ,� > ��8 (��, ��6� � ��6��

��:��9 �65�(� �� 5��&�� 5�� > � �� E��( > 8��8��; �� 5�� 8��,

5��3�� 5��= F�� 5��( > 5��*6�, �� 5�( �� 3�� (��,6

5��,�� 9 �� #$�� 5�� *�� 6�E�� 5�(= i� & ��

7��&�� :�:(�� > ��, �� 5��&�� 5�� 5��&�� 5�� (�� =

�� s 5��&�� 3��8� ��5�6 �,� 5��

�� ,��6 5��&�� 5��8 �� >, 5�� > ��

3��= ��(� 5��6� �2��,6 �� 3��6 � *��5�� 5��3��$�� $ #�5�� $ 6��, �

�6�� $��=

)��#�� $ 5�� $ ��(�� /��(#�� )�:�� 6��8�, ��)-� NASA

3��,�� 6�� BPP 3�(�� 3�� 73(�3��,6 ��$ 3�� 8 ��

5��&�� 9 ��8 E��( ��2�� #$�� 5��6� �,�� 73(�3��, �� $�� >��3��

,�8$�6��, (��*��6��= ��#��6 ��*� ��6� �� 3�(�� - �� =

��

1. s �� (�� - ��&�� 4�� ژ�� t9 �� 2013�L9 ��6��

2. "Armenian Theory of Special Relativity", Infinite Energy, Volume 20, Issue 115, 2014, USA

3. "Armenian Theory of Special Relativity Illustrated", academia.edu, archive.org,..., �� 2014�L

17 - 17

Armenian Theory of Special Relativity ©

( Illustrated)

Robert Nazaryan1,� & Haik Nazaryan2

1Physics Department, Yerevan State University, Yerevan 0025, Armenia

2Physics and Astronomy Department, California State University, Northridge, USA

Abstract

The aim of this current article is to illustrate in detail Armenian relativistic formulas and compare them with Lorentzrelativistic formulas so that readers can easily differentiate these two theories and visualize how general and rich ourArmenian Theory of Special Relativity really is with a spectacular build in asymmetry.

Then we are going behind this comparison and illustrating that build in asymmetry inside Armenian Theory of SpecialRelativity is reincarnating the aether as a universal reference medium, which is not contrary to relativity theory. Wemathematically prove the existence of aether and we show how to extract infinite energy from the time-space or sub-atomicaether medium. Our theory explains all these facts and peacefully brings together followers of absolute aether theory,relativistic aether theory or followers of dark matter theory. We also mention that the absolute aether medium has a verycomplex geometric character, which has never been seen before.

We are explaining why NASA’s earlier "BPP" and DARPA’s "Casimir Effect Enhancement" programs failed.We are also stating that the time is right to reopen NASA’s BPP program and fuel the spacecrafts using the everywhere

existing aether asymmetric momentum force.

PACS: 03.30. �p

Keywords:Armenian Relativity; Lorentz Relativity; Relativistic; Transformations; Kinematics; Dynamics; Free Energy; Dark Energy

¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯

* Corresponding Author, E-mail: [email protected]

© USA Copyright Office Registration Numbers: TXu 1-843-370 and TXu 1-862-255

© Comparison Armenian and Lorentz Relativistic Formulas ©

1. Introduction(Legacy science as an organized institution dug its own grave.)

First of all we appreciate the fact that our article "Armenian Theory of Special Relativity" eventually was published in twomagazines, who found it important enough to deliver our new revolutionary ideas in physics to the scientific community.

1. Inaugural Issue of IJRSTP (International Journal of Reciprocal Symmetry and Theoretical Physics), volume 1,number 1 (April-2014), by Asian Business Consortium Research House ABC.

2. "Infinite Energy" magazine on the historic 25-th anniversary of cold fusion conference, volume 20, issue 115(May-2014), by New Energy Foundation. The magazine of new energy science and technology.

These two magazines provides a forum of debate for frontier science and that’s why our article "Armenian Theory ofSpecial Relativity" has been published in its proper places where scientists can discuss new derived generalizedLorentz-Poincare relativistic theory with new amazing relativistic formulas and find a way to harness infinite energy fromtime-space continuum or more precisely from the aether as a hidden sub-quantum medium.

The aim of this current article is to illustrate in detail Armenian relativistic formulas and compare them with Lorentzrelativistic formulas so that readers can easily differentiate these two theories and visualize how general and rich ourArmenian Theory of Special Relativity really is with a spectacular build in asymmetry.

It is worth to mention also that Lorentz transformation equations and all other Lorentz relativistic formulas can beobtained from the Armenian Theory of Special Relativity as a particular case, by substituting s � 0 and g � �1.

NASA’s earlier program (between 1996 and 2003 years) called "Breakthrough Propulsion Physics" failed because theydidn’t have correct relativistic formulas. The same happened with DARPA’s "Casimir Effect Enhancement program" whentrying to harness the Casimir force in a vacuum and using that energy to power a propulsion system. They didn’t succeedeither because of the same reason - they did not have correct quantum mechanics theory and equations.

The time is right to reopen NASA’s BPP program, but this time using our everywhere existing aether momentum force.In our humble opinion, using Armenian Theory of Special Relativity and it’s promising relativistic formulas - all that work

can be done within two to three years, which will bring forth the dawn of a new technological era.That’s why It is our pleasure to inform the scientific community at large, that in our main research-manuscript we have

succeeded to build a mathematically solid theory of special relativity in one dimensional space and derive newtransformation equations and many other new fascinating relativistic formulas, which are an unambiguous generalization ofthe Lorentz transformation equations and all other Lorentz relativistic formulas. Our article is the accumulation of all effortsfrom mathematicians and physicists to build a more general transformation equations of relativity in one dimension.

Our published manuscript creates a paradigm for advance studies in relativistic kinematics and dynamics. The crownjewel of the Armenian Theory of Special Relativity is Armenian energy and momentum formulas, which the world has neverseen before. Our Armenian theory has unpredictable applications in applied physics. Such as, by manipulating thetime-space numerical constants s and g (particularly in chemical or in thermal environment) we can obtain numerous mindblowing practical results, including a theoretical pointer of how to harness infinite energy from time-space continuum andhow to use rest particle asymmetric momentum formula to do it.

Our manuscript would be of interest to a broad readership including those who are interested in theoretical aspects ofteleportation, time travel, antigravitation, free energy and much more...

The time has come to reincarnate the aether as a universal reference medium which is not contrary to relativity theory,because for aether inertial system the asymmetric coefficient just equals zero �s � 0�. And our theory explains all thesefacts and peacefully brings together followers of absolute aether theory, relativistic aether theory or followers of dark mattertheory. We just need to mention that the absolute aether medium has a very complex geometric character, which has neverbeen seen before.

Armenian Theory of Relativity differs from all other cold fusion researchers theories by not constructing some artificialformulas to explain the innumerous infinite energy experimental results. We instead succeeded on building a beautifultheory of relativity (in one dimension) and accordingly received many very important new formulas. Finally wemathematically proved the existence of universal aether inertial system and Armenian relativistic formulas need to guide allbright experimentators on the journey of how to extract infinite energy from the time-space or sub-atomic aether medium.

The time is right to say that 100 years of inquisition in physics is now over and Aether Energy Age has begun!

2 - 11


2. Legend of the Used Symbols

� Fundamental physical quantities

t � time coordinate notation

x � space coordinate notation

� � general scalar quantity notation

A � general vector quantity notation

m�0

and mL0 � Armenian and Lorentz rest masses

m and m� � masses of the moving particle m0

(01)

� Direct and reciprocal relative velocity notations

v � velocity K� inertial system respect to the K inertial system

v� � velocity K inertial system respect to the K� inertial system

u � velocity K�� inertial system respect to the K� inertial system

u� � velocity K� inertial system respect to the K�� inertial system

w � velocity K�� inertial system respect to the K inertial system

w� � velocity K inertial system respect to the K�� inertial system

(02)

� Acceleration notations

a, a�

and aL � accelerations of the particle in the K inertial system

b, b� and bL � accelerations of the particle in the K� inertial system (03)

� Derived physical quantities

�� and �L � Armenian and Lorentz Lagrangian notations

E�

and EL � Armenian and Lorentz energy notations

P�

and PL � Armenian and Lorentz momentum notations

F�

and FL � Armenian and Lorentz force notations

EG and PG � Galilean energy and momentum notations�� and

�� L � Armenian and Lorentz transformation matrixes

�h� and

�hL � Armenian and Lorentz mirroring matrixes

(04)

� Mirror reflection notations for physical quantities

�

t � mirror reflection of the time quantity t�x � mirror reflection of the space quantity x

�w � w� � mirror velocity equals reciprocal velocity

�� mirror reflection of the scalar quantity ��

A � mirror reflection of the vector quantity A�a ,

�a� and

�aL � mirror reflections of the accelerations a, a

�and aL

�

F� and�

FL � mirror reflections of the forces F�

and FL

�

E� and�

EL � mirror reflections of the energies E�

and EL

�

P� and�

PL � mirror reflections of the momentums P�

and PL

(05)

3 - 11


3. Comparison Armenian and Lorentz Relativistic Formulas

Time-Space Mirror Transformation Equations �12�1

Armenian transformations Lorentz transformations

�

t � t � 1c sx

�x � �x

and

�

t � t�x � �x

(06)

Time-Space Transformation Equations Between Moving Inertial Systems �4�1

� Direct transformations


t� � ��v� 1 � s v

c t � g vc2

x

x� � ��v��x � vt�

andt� � �

L�v� t � vc2

x

x� � �L�v��x � vt�

(07)

� Inverse transformations


t � ��v�� 1 � s v�

c t� � g v�

c2x�

x � ��v��x� � v�t��

andt � �

L�v�� t� � v�

c2x�

x � �L�v

��x� � v�t��

(08)

General Scalar-Vector ��,A� Mirror Transformation Equations


�� sA�

A � �Aand

��

A � �A

(09)

General Scalar-Vector ��,A� Transformation Equations Between Moving Inertial Systems



�� v� 1 � s v

c � � g vc A

A� � ��v� A � v

c �and

�� L�v� � � v

c A

A� � �L�v� A � v

c �

(10)

� Inverse transformations


� � ��v�� 1 � s v�

c �� g v�

c A�

A � ��v�� A� � v�

c ��

and� � �

L�v�� v�

c A�

A � �L�v

�� A� � v�

c ��

(11)

4 - 11


Mirror Transformation Matrixes

Armenian mirroring matrix Lorentz mirroring matrix

��

1 s

0 �1and

��L �

1 0

0 �1

(12)

General Scalar-Vector ��,A� Relative Movement Transformation Matrixes

Armenian transformation matrix Lorentz transformation matrix

��

��v�

1 � s vc g v

c� v

c 1� �

��v��

1 �g v�

cv�

c 1 � s v�

c

and�� L � �

L�v�1 � v

c� v

c 1

(13)

Relation Between Reciprocal and Direct Relative Velocities �5�1

Armenian relations Lorentz relation

v� � �v

1 � s vc

v � �v�

1 � s v�

c

and v� � �v (14)

For both relations in �14� true the following transformation:

�v�� v (15)

Gamma Function Formulas �6�1

Armenian gamma functions Lorentz gamma function

��v� �

1

1 � s vc � g v2

c2

� 0

��v��

1

1 � s v�

c � g v�2

c2

� 0

and �L�v

�� L�v� �

1

1 � v2

c2

� 0 (16)

Gamma Functions Properties �7�1

Armenian properties Lorentz properties

v��v�� v�

��v�

��v��

��v� 1 � s v

c � 0

��v�� 1 � 1

2s v�

c � ��v� 1 � 1

2s v

c

and

v��L�v�� v�L�v�

�L�v�� L�v� � 0

(17)

Invariant Interval Formulas �8�1

Armenian interval formula � �2 � �ct��2� s�ct��x� � gx�2 � �ct�2 � s�ct�x � gx2 � 0

Lorentz interval formula � �2 � �ct��2� x�2 � �ct�2 � x2 � 0

(18)

5 - 11


Addition of Velocities and Gamma Function Transformations �10�1


w � u � v �u � v � s vu

c1 � g vu

c2

��w� � �

��v��

��u� 1 � g vu

c2

and

w � u � v �u � v

1 � vuc2

�L�w� � �

L�v��L�u� 1 � vuc2

(19)

Subtraction of Velocities and Gamma Function Transformations �10�1


u � w � v �w � v

1 � s vc � g vw

c2

��u� � �

��v��

��w� 1 � s v

c � g vwc2

and

u � w � v �w � v

1 � vwc2

�L�u� � �

L�v��L�w� 1 � vwc2

(20)

Time and Length Changes Respect K Inertial System �9�1

Armenian changes Lorentz changes

t � ��v�t0 �

t0

1 � s vc � g v2

c2

l �l0

��v�

� l0 1 � s vc � g v2

c2

and

t � �L�v�t0 �

t0

1 � v2

c2

l �l0

�L�v�

� l0 1 � v2

c2

(21)

Time and Length Changes Respect K� Inertial System �9�1

Armenian changes Lorentz changes

t� � ��v��t0 �

t0

1 � s v�

c � g v�2

c2

l� �l0

��v��

� l0 1 � s v�

c � g v�2

c2

and

t� � �L�v�t0 �

t0

1 � v2

c2

l� �l0

�L�v�

� l0 1 � v2

c2

(22)

Surpluses (Residues) of the Time and Length Changes

Armenian surpluses Lorentz surpluses

��t�� t� � t � s vc t � �s v�

c t�

��l�� l � l� � s vc l� � �s v�

c land

��t�L � 0

��l�L � 0

(23)

Accelerations Mirror Transformation Equations

Armenian transformations Lorentz transformation

�a � �

1

1 � s wc

3a

a � �1

1 � s w�

c3

�a

and�a � �a

(24)

6 - 11


Acceleration Transformation Equations Between Moving Inertial Systems �16�1


b �1

��3 �v� 1 � s v

c � g vwc2

3a

a �1

��3 �v� 1 � g vu

c2

3b

and

b �1

�L3�v� 1 � vw

c2

3a

a �1

�L3�v� 1 � vu

c2

3b

(25)

New Accelerations Definitions �17�1

Armenian accelerations Lorentz accelerations

a�

� ��3 �w�a � �

�3 �u�b

�a� � ��

�3 �w��

�a � ��

�3 �u��

�

band

aL � �L3�w�a � �L

3�u�b

�aL � ��L

3�w��a � ��L

3�u��

b

(26)

New Accelerations Properties

Armenian properties Lorentz properties

�a� � �a

�

�a� � a

�

and

�aL � �aL

�aL � |aL |

(27)

Lagrangian Functions For Free Moving Particle �18�1

Armenian Lagrangian Lorentz Lagrangian

��w� � � m0c2 1 � s w

c � g w2

c2and �L�w� � � m0c2 1 � w2

c2

(28)

Lagrangian Functions Mirror Transformation Equations


��w��

��w�

1 � s wc

��w� �

��w��

1 � s w�

c

and

�L�w�� L�w�

�L�w� � �L�w��

(29)

Lagrangian Function Transformation Equations Between Moving Inertial Systems

Armenian Transformations Lorentz Transformations

��u� �

1 � s vc � g v2

c2

1 � s vc � g vw

c2

��w�

��w� �

1 � s vc � g v2

c2

1 � g vuc2

��u�

and

�L�u� �

1 � v2

c2

1 � vwc2

�L�w�

�L�w� �

1 � v2

c2

1 � vuc2

�L�u�

(30)

7 - 11


Free Moving Particle Energy and Momentum Formulas �19�1

(The Crown Jewel of the Armenian Theory of Relativity)

Armenian formulas Lorentz formulas

E��w� �

1 � 12

s wc

1 � s wc � g w2

c2

m0c2

P��w� � �

g wc � 1

2s

1 � s wc � g w2

c2

m0c

and

EL�w� �1

1 � w2

c2

m0c

PL�w� �1

1 � w2

c2

m0w

(31)

Energy and Momentum Transformation Equations Between Moving Inertial Systems �24�1


Armenian transformations Lorentz Transformations

E��

��v� E

�� vP

�

P��

��v� 1 � s v

c P�� g v

c2E�

andEL� � �L�v��EL � vPL �

PL� � �L�v� PL � v

c2EL

(32)

� Inverse Transformations

Armenian transformations Lorentz Transformations

E��

��v�� E

�� v�P

��

P��

��v�� 1 � s v�

c P�� g v�

c2E��

andEL � �L�v� EL

� � vPL�

PL � �L�v� PL� � v

c2EL�

(33)

Invariant (or Full) Energy-Momentum Formulas �25�1

� Armenian invariant energy-momentum formula

P�

2� sP

�

E�

c � gE�

c

2

� P��

2� sP

��

E��

c � gE��

c

2

� �g � 14

s2��m0c�2 � 0 (34)

� Lorentz invariant energy-momentum formula

ELc

2

� �PL �2 �

EL�

c

2

� �PL� �

2� �m0c�

2 � 0 (35)

Energy and Momentum Mirror Reflection Formulas

Armenian formulas Lorentz formulas

�

E� � E�

�

P� � P� � �s 1c E

�

and

�

EL � EL

�

PL � PL � 0

(36)

Time and length change formulas in �21� and �22� was derived in our manuscript, therefore they’re correct. We havenot yet succeeded in deriving the correct formula for representing a moving particles mass change, therefore we need todecide which formula of mass change is a more proper choice, until we find the way to derive it or make an experiment tofind the right formula. There are three logical choices: first choice is to go the legacy relativity way and the other two choicesfollows directly from the Armenian energy and momentum formulas. All those three choices can be seen below:

8 - 11


1� Legacy relativity way � m � ��w�m0

2� E�� mc2 � m �

E�

c2� �

��w� 1 � 1

2s w

c m0

3� P� � mw � m �P�

w � ��w�

g wc � 1

2s

wc

m0

(37)

We need to analyze these three choices separately and then calculate the mass surpluses for these three cases.For legacy relativity, all these three cases coincide with each other and therefore, there is no contradiction at all.

Mass Changes Respect K and K� Inertial Systems �9�1

1. First choice

Armenian changes of the moving mass m0 Lorentz changes of the moving mass m0

m � ��w�m0 �

m0

1 � s wc � g w2

c2

m� � ��w��m0 �

m0

1 � s w�

c � g w�2

c2

and

m � �L�w�m0 �

m0

1 � w2

c2

m� � �L�w

��m0 �m0

1 � w2

c2

(38)

Surpluses of the mass for this case

Armenian surplus Lorentz surplus

��m�� m� � m � s wc m � � s w �

c m � and ��m�L � m� � m � 0 (39)

2. Second choice


m � ��w� 1 � 1

2s w

c m0 �1 � 1

2s w

c

1 � s wc � g w2

c2

m0

m� � ��w�� 1 � 1

2s w�

c m0 �1 � 1

2s w�

c

1 � s w�

c � g w�2

c2

m0

and

m � �L�w�m0 �

m0

1 � w2

c2

m� � �L�w�m0 �

m0

1 � w2

c2

(40)

Surpluses of the mass changes for this case


��m�� m� � m � 0 and ��m�L � m� � m � 0 (41)

3. Third choice


m � ��w�

g wc � 1

2s

wc

m0 � �cw g w

c � 12

s

1 � s wc � g w2

c2

m0

m� � ��w��

g w�

c � 12

s

w�

c

m0 � �

cw�

g w�

c � 12

1 � s w�

c � g w�2

c2

m0

and

m � �L�w�m0 �

m0

1 � w2

c2

m� � �L�w�m0 �

m0

1 � w2

c2

(42)

9 - 11


Surpluses of the mass changes for this case


��m�� m� � m � ��w� 1 � s w

c

12

s � � 12

s2 � g� wc

wc

m0 and ��m�L � m� � m � 0 (43)

The mass of the moving particle is not an important quantity anymore. The more important quantity becomes theparticle’s rest mass m0 which has a real physical meaning. In Armenian Theory of Special Relativity we also define a newrest mass quantity, which is more general and can also have a negative value as well, just like a particle’s charge.

Rest Mass Formulas �21�1

Armenian rest mass Lorentz rest mass

m�0

� ��g � 14

s2�m0 � 0 and mL0 � m0 � 0 (44)

Force Formulas �26�1

Armenian force formula Lorentz force formula

F�

� ��g � 14

s2�m0��3 �w�a � m

�0a�

�

F� � ��g � 14

s2�m0��3 �w��

�a � m

�0

�a�

andFL � m0�L

3�w�a � m0aL

�

FL � m0�L3�w��

�a m0

�aL

(45)

Force Transformation Formulas Between Moving Inertial Systems �27�1

Preserved Newton’s laws Armenian formulas Lorentz formulas

Newton’s second law

Newton’s third law�

F�

� F��

�

F� � �F�

andFL � FL

�

�

FL � �FL

(46)

Rest Particle Energy and Momentum Formulas Progress Chronicle �22�1

Galilean formulas | Lorentz formulas | Armenian formulas

EG�0� � 0

PG�0� � 0�

EL�0� � m0c2 �

PL�0� � 0�

E��0� � m0c2 �

P��0� � � 1

2sm0c �

(47)

� - This rest particle energy formula gives us nuclear power.� - This rest particle momentum formula is the Armenium formula - gift to humanity as a clean and free energy source.

Range of Velocities of Moving Particle in the Armenian Theory of Relativity �13,14,15�1

g \ s | s � 0 | s � 0 | s � 0

� � � � � � � � � � � � � � � � � � � � � � � � � � � � � � � � � � �

g � 0 | 0 � w � w0 | 0 � w � c � 1g | 0 � w � w0

g � 0 | 0 � w � � 1s c | 0 � w � � | 0 � w � �

0 � g � � 12

s�2| 0 � w � � 1

s c | 0 � w � � | 0 � w � �

g � � 12

s�2| 0 � w � � 1

s c | 0 � w � � | 0 � w � �

(48)

10 - 11


4. Conclusions

As you can see from the above comparisons of Armenian and Lorentz relativistic formulas, Armenian relativisticformulas is full of asymmetry, which is in every single formula because of coefficient asymmetry s and that asymmetry isthe essence and exciting part of the Armenian Theory of Relativity. Therefore we define a brand new geometrical space -Armenian Space to satisfy Armenian Theory of Special Relativity, with very strange properties in three dimensions, such as:

i � i � i � i � and i � � i � � s� i � (49)

Let’s start analyzing the crown jewel of the Armenian Theory of Relativity - the Armenian energy and momentumformulas �31�. Then we find out that the free moving particle with velocity w in the inertial system K has the followingthree extreme situations:

1� moving particle’s velocity equals zero � w � 0

2� moving particle’s energy equals zero � E��w� � 0

3� moving particle’s momentum equals zero � P��w� � 0

(50)

For these three cases �50� the particle has different velocities and accordingly, using �16�, we have three differentvalues of Armenian gamma function as shown below:

1� w � 0 � ��0� � 1

2� w � � 2s c � w1 � �

��w1� �

12

s

g � 14

s2

3� w � � 12

sg c � w2 � �

��w2� � 1

1 � 14

s2

g

(51)

Therefore using the velocity and Armenian gamma function values given by �51�, we can obtain from �31� the particle’sArmenian energy and momentum values for these three extreme cases:

1� E��0� � m0c2 and P

��0� � � 12

sm0c

2� E��w1� � 0 and P

��w1� � g � 14

s2 m0c

3� E��w2� � 1 � 1

4s2

g m0c2 and P��w2� � 0

(52)

How can we explain all of these strange results, which is unthinkable from the legacy physics point of view? What isreally the physical meanings of the following three cases?

1�When a particle is resting in the inertial system K �w � 0�, but particle still has a momentum.2�When a particle is moving at velocity w1 with respect to the inertial system K, but it’s energy equals zero.3�When particle moves with respect to the inertial system K at velocity w2, but this time it’s momentum equal zero.Most physicists today would view all of these bizarre results - straight results of the Armenian Theory of Relativity, as

complete madness and they will say that all these facts would bring the end of physics as we know it.Till now due to extreme dogmatism, the properties of time-space asymmetry and all physical quantities asymmetric

transformations are never “officially” studied. The role of symmetry violations in physics is not understood by physicists.That is where the Armenian Theory of Special Relativity comes to play, which explains all of these "impossible

violations" and brings to question all physical laws of legacy hard science and demands a revision under these remarkablenew circumstances.

For example, in the first case - the velocity of the particle equals zero, which means that the particle is at rest in theinertial system K, but the same particle still has momentum which is dependent on coefficient s. There is only one logicalexplanation - that there exists an aether medium and that the aether is silently dragging the particle back in the oppositedirection of the movement inertial system K. We can harness infinite energy from that rest particle’s momentum just as weare harnessing energy from the wind using a windmill.

In the same manner we can explain the third case, but the second case is a bit of a challenge.

Reference[1] R. Nazaryan and H. Nazaryan, Infinite Energy, Vol. 20, Issue 115, Pages 40-42 (2014)

11 - 11

Armenian Theory of Special Relativity ©

Robert Nazaryan1� & Haik Nazaryan2

1Physics Department, Yerevan State University, Yerevan 0025, Armenia2Physics and Astronomy Department, California State University Northridge, USA

ABSTRACT

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.

PACS: 03.30.�p, 04.20.FyKeywords: Relativity, Relativistic, Transformations, Kinematics, Dynamics, Free Energy, Dark Energy

INTRODUCTION

On the basis of the previous works of different authors,[2,3,4,5] a sense of hope was developed that it is possible to builda general theory of Special Relativity without using light phenomena and its velocity as an invariant limited speed of nature.The authors also explore the possibility to discard the postulate of isotropy time-space.[1,4]

In the last five decades, physicists gave special attention and made numerous attempts to construct a theory of SpecialRelativity from more general considerations, using abstract and pure mathematical approaches rather than relying on socalled experimental facts.[6]

After many years of research we came to the conclusion that previous authors did not get satisfactory solutions andthey failed to build the most general transformation equations of Special Relativity even in one dimensional space, becausethey did not properly define the universal invariant velocity and did not fully deploy the properties of anisotropic time-space.

However, it is our pleasure to inform the scientific community that we have succeeded to build a mathematically solidtheory 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 transformationsbetween two inertial systems assume the same functional forms as the original (direct) transformations. The principle ofhomogeneity 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).

(1)

Besides the postulates �1�, for simplicity purposes we also need to use the following initial conditions as well:

When t � t� � t�� . . .� 0

Then origins of all inertial systems coincide each other, therefore x0 � x0� � x0

�� . . .� 0 (2)

Because of the first and third postulates �1�, time and space transformations between two inertial systems are linear:

Direct transformations Inverse transformations

t� � �1�v�t � �2�v�x

x� � �1�v�x � �2�v�tand

t � �1�v��t� � �2�v

��x�

x � �1�v��x� � �2�v

��t�

(3)

¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯ ¯© - USA Copyright Office Registration Numbers: TXu 1-843-370 and TXu 1-862-255� - To whom correspondence shoud be addressed: [email protected]

© "Armenian Theory of Special Relativity - One Dimensional Movement" Letter ©

ARMENIAN RELATIVISTIC KINEMATICS

Using our postulates �1� with the initial conditions �2� and implementing them into the general form of transformationequations �3�, we finally get the most general transformation equations in one physical dimension, which we call - Armeniantransformation equations. Armenian transformation equations, contrary to the Lorentz transformation equations, has twonew constants ( s and g ) which characterize anisotropy and homogeneity of time-space. Lorentz transformation equationsand all other formulas can be obtained from the Armenian Theory of Special Relativity by substituting s � 0 and g � �1.


t� � ��v� �1 � s v

c �t � g vc2

x

x� � ��v��x � vt�

andt � �

��v�� 1 � s v�

c t� � g v�

c2x�

x � ��v��x� � v�t��

(4)

Relations between reciprocal and direct relative velocities are:

v� � � v1 � s v

c

v � � v�

1 � s v�c

� �1 � s vc � 1 � s v�

c � 1 (5)

Armenian gamma functions for direct and reciprocal relative velocities, with Armenian subscript letter �, are:

��v� � 1

1 � s vc � g v2

c2

� 0

��v�� 1

1 � s v�c � g v�2

c2

� 0

� ��v��

��v�� 1

1 � g vv�

c2

� 0 (6)

Relations between reciprocal and direct Armenian gamma functions are:

��v��

��v��1 � s v

c � � 0

��v� � �

��v�� 1 � s v�

c � 0also �

��v��v� � � �

��v�v (7)

Armenian invariant interval (we are using Armenian letter � ) has the following expression:

�2 � �ct��2� s�ct��x� � gx�2 � �ct�2 � s�ct�x � gx2 � 0 (8)

Armenian formulas of time, length and mass changes in K and K� inertial systems are:

t � ��v�t0 �

t0

1 � s vc � g v2

c2

l �l0

��v�

� l0 1 � s vc � g v2

c2

m � ��v�m0 �

m0

1 � s vc � g v2

c2

and

t� � ��v��t0 �

t0

1 � s v�c � g v�2

c2

l� �l0

��v��

� l0 1 � s v�c � g v�2

c2

m� � ��v��m0 �

m0

1 � s v�c � g v�2

c2

(9)

Transformations formulas for velocities (addition and subtraction) and Armenian gamma functions are.

u � u� � v �u� � v � s vu�

c

1 � g vu�

c2

��u� � �

��v��

��u�� 1 � g vu�

c2

and

u� � u � v � u � v1 � s v

c � g vuc2

��u��

��v��

��u� 1 � s v

c � g vuc2

(10)

2 - 4


If we in the K inertial system use the following notations for mirror reflection of time and space coordinates:_t � mirror reflection of time t_x � mirror reflection of space x

(11)

Then the Armenian relation between reflected_t,

_x and normal �t,x� time-space coordinates of the same event are:

_t � t � 1

c sx_x � �x

andt �

_t � 1

c s_x

x � �_x

(12)

The ranges of velocity w for the free moving particle, depending on the domains of time-space constants s and g, are

g \ s | s � 0 | s � 0 | s � 0

� � � � � � � � � � � � � � � � � � � � � � � � � � � � � � � � � � �

g � 0 | 0 � w � w0 | 0 � w � c � 1g | 0 � w � w0

g � 0 | 0 � w � � 1s c | 0 � w � � | 0 � w � �

(13)

Where w0 is the fixed velocity value for g � 0, which equals to: w0 � � 1g

12

s � � 12

s�2� g c � 0 (14)

Table �13� shows that there exists four different and distinguished range of velocities w for free moving particle, whichare produced by different domains of time-space constants s and g as shown in the table below:

g � 0, s � 0 | g � 0, s � 0, s � 0 | g � 0, s � 0 | g � 0, s � 0

0 � w � c � 1g | 0 � w � w0 | 0 � w � � 1

s c | 0 � w � � (15)

Table �15� shows us that each distinct domains of s, g time-space 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 withdifferent flavours (depending on domains of s ).

ARMENIAN RELATIVISTIC DYNAMICS

Armenian formulas for acceleration transformations between K� and K inertial systems are:

a� � 1

��3 �v� 1 � s v

c � g vuc2

3a

a � 1

��3 �v� 1 � g vu�

c2

3a�

(16)

Armenian acceleration formula, which is invariant for given movement, we define as:

a��

�3 �u�a � �

�3 �u��a� (17)

Armenian relativistic Lagrangian function for free moving particle with velocity w is:

��w� � � m0c2 1 � s w

c � g w2

c2 (18)

Armenian relativistic energy and momentum formulas for free moving particle with velocity w are:

E��w� � �

��w��1 � 1

2s w

c �m0c2 �1 � 1

2s w

c

1 � s wc � g w2

c2

m0c2

p��w� � � �

��w��g w

c � 12

s�m0c � �g w

c � 12

s

1 � s wc � g w2

c2

m0c

(19)

3 - 4


First approximation of the Armenian relativistic energy and momentum formulas �19� are:

E��w� � m0c2 � �g � 1

4s2�� 1

2m0w2� � m0c2 � 1

2m�0w2

p��w� � � 1

2sm0c � �g � 1

4s2��m0w� � � 1

2sm0c � m�0w

(20)

Where we denote m�0 as the Armenian rest mass, which equals to:

m�0

� ��g � 14

s2�m0 � 0 (21)

Armenian momentum formula for rest particle �w � 0�, which is a very new and bizarre result, is:

p��0� � � 1

2sm0c (22)

From �22� we obtain Armenian dark energy and dark mass formulas, with Armenian subscript letter �, and they are:

E� �p�02

2m0� 1

8s2m0c2 � 1

8s2E0 and m

�� 1

8s2m0 (23)

Armenian energy and momentum transformation equations �g � 0� are:


gE��

c � ��v� g

E�

c � g vc p

�

p��

��v� �1 � s v

c �p�� v

c gE�

c

and

gE�

c � ��v� �1 � s v

c � gE��

c � g vc p

��

p��

��v� p

�� v

c gE��

c

(24)

From �24� we get the following invariant Armenian relation �g � 0�:

gE�

c

2

� s gE�

c p� � g p�2� g

E��

c

2

� s gE��

c p�� g p

��

2� g�g � 1

4s2��m0c�2 (25)

Armenian force components in K and K� inertial systems are (see full article):

F�0 � d

dtgc E� � g u

c F�

F�� d

dtp�

� m�0

a�

andF��0 � d

dt�gc E

�� g u�

c F�

F�� d

dtp�� m

�0a�

(26)

From �26� it follows that Armenian force space components are also invariant:

F�� F

�� m

�0a�

(27)

As you 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.

You can get our full article with all derivations, proofs and other amazing formulas (in Armenian language) via E-mail.

REFERENCES

[1111] Edwards W F, 1963, Am. J. Phys. 33331111, 482-90.

[2222] Jean-Marc Levy-Leblond, 1976, Am. J. Phys. Vol. 44444444, No. 3333.

[3333] Vittorio Berzi and Vittorio Gorini, 1969, J. Math. Phys., Vol. 11110000, No. 8888.

[4444] Jian Qi Shen, Lorentz, Edwards transformations and the principle of permutation invariance, (China, 2008).

[5555] Shan Gao, Relativiti without light: a further suggestion, (University of Sydney).

[6666] G. Stephenson and C. W. Kilminster, Special relativity for Physicists, (Longmans, London, 1958), Ch. 1.

4 - 4

Time and Space Reversal Problems

In Armenian Theory of Relativity©

( One Dimensional Space )

Armenian Theory of Asymmetric Relativity©

Robert Nazaryan1,� & Haik Nazaryan2

1Physics Department, Yerevan State University, Yerevan, Armenia

2Physics Department, California State University, Northridge, USA

Abstract

In this current article we are analyzing in detail, T-symmetry (time reversal transformation) and P-symmetry (spatialinverse transformations) phenomenons in Armenian Theory of Relativity in one dimensional physical space. For thatpurpose we are referring and using our previous articles results, especially in the case of research mirror reflectionphenomena (spatial inversion) where we are mostly referring to our main research article, published in Armenia on June2013 (96 pages).

We are delighted to know that Armenian Theory of Relativity has passed the first phase of total ridicule and now is inthe phase of active discussion in scientific communities across the world. This article can be considered as an answer tothe physicists who criticize the Armenian Theory of Relativity by saying that the Armenian relativistic transformations andformulas are not an invariant under time-reversal transformation and therefore Armenian Theory of Relativity is wrong.

In the first section of our article we are showing that in the case of time-reversal, Armenian Theory of Relativity is infull agreement with legacy physics and therefore our opponents criticisms in that matter are baseless.

In the case of spatial inversion (in our case mirror reflection) Armenian Theory of Special Relativity does notcontradict in quality with legacy physics, but gives a more detailed and fine description of that phenomena, which in themacro-world is mostly unobservable but plays a very significant role in the micro-world.

Our received results can explain many parity irregularities in elementary particle physics, especially the violation parityprocess in weak interactions.

PACS: 03.30. �p

Keywords:Armenian Relativity; Lorentz Relativity; Relativistic Transformations; Time Reversal; Space Reversal; Free Energy

____________________________________

* - Corresponding Author E-mail: [email protected]

© - USA Copyright Office Registration Numbers: TXu 1-843-370 , TXu 1-862-255 and TXu 1-913-513

Time and Space Reversal Problems in Armenian Theory of Relativity

Introduction

Scientists examine symmetry properties of the Universe to solve problems and to search for new understandings ofthe physical laws governing the behavior of matter of the world around us (both macro and micro). That is what we havedone in our new Armenian Theory of Relativity, where we are exploring totally new uncharted territory.

If we like to effectively present our article and explain only time-reversal phenomena or only space-reversalphenomena or both: time-reversal and space-reversal phenomenons together, then we really need to understand thephysical meanings of these two different phenomenons. It is worth to mention that the one dimensional space-reversalphenomena is equivalent to the mirror reflection phenomena, which is the main content of our article.

Time-reversal phenomena has many philosophical complexities such as time travel and so on, but its physicalmeaning is a very simple mathematical action which leaves the physical formula unchanged or negates the formula. Wealso need to mention that all fundamental physical quantities, which are not derived from time stays unchanged, such astest particle spatial coordinates �x � x�, masses �m � m� and charges �q � q�. Therefore in all legacy physics formulas,besides for negating time and keeping the test particle spatial coordinates, masses and charges unchanged, we also needto negate the physical quantities, which have been derived by odd order derivation of spatial coordinates by time. Forexample we need to negate the sign of all velocities �u � �u�. On the contrary, if physical quantities which have beenderived by even order derivation of spatial coordinates by time, then those must stay unchanged such as the test particleacceleration �a � a�.

Spatial coordinates inversion, which in our article means mirror reflection action about X axis, is surprisinglybecoming a more complex physical phenomena than time-reversal phenomena. If we like to fully understandparity-reversal phenomena physical meanings and describe it mathematically, we need to define the idea of oppositeinertial systems. Afterward all Armenian relativistic formulas need to be rewritten according to the new defined direct andopposite inertial systems and then find relation between those two type of quantities and formulas.

First we will investigate in detail the time-reversal phenomena case and then shift all our attention to spatial-inversion(mirror-reflection) phenomena in Armenian Theory of Special Relativity.

Contrary to Lorentz theory of relativity, Armenian Theory of Relativity is more rich because of two new time-spacecharacterizing coefficients s and g. Therefore, except for the above mentioned concern, in time-reversal andmirror-reflection cases, we also need to simultaneously make the following changes.

a) In the time-reversal case in Armenian Theory of Relativity we need to also negate the sign of coefficients and leave the sign of coefficient of g unchanged. So we need to make the following substitutions:�s � �s� and �g � g�.b) In the mirror-reflection case in Armenian Theory of Relativity we need to leave both s and gtime-space constants unchanged: �s � s� and �g � g�.

We also like to emphasize that we did not denote coefficient s that letter by accident, but we denote it by design,because it is the spin-like quantity in Macro World, which will be represented as a real vector in the three dimensionalworld. But in the Micro World that coefficient s in reality represents the spin of the test particle. We like to remind youalso that in quantum mechanics, in the case of time-reversal, the spin sign is negated and in case of mirror reflection the

spin sign is left unchanged. Therefore we can conclude that everything is in complete harmony with legacy physics.

It is worth to mention again that all legacy physics (classical and relativistic) transformations and formulas can beobtained from Armenian Theory of Relativity as a particular case by substituting s � 0 and g � �1 .

In the end we like to make a statement that: Armenian Theory of Relativity is a Theory of Asymmetric Relativity.

2 - 17


1 - Only Time Reversal Phenomena Consideration

First lets write down all quantities of legacy mechanics, which in the case of time-reversal, their sign either stays

invariant or is negated. Those physical quantities are listed below.

� The signs of the following physical quantities of legacy mechanics stays invariant

The mass of the test particle � m � m

The position of the test particle � r � r

The acceleration of the test particle � a � a

The energy of the test particle � E � E

The force on the test particle � F � F

(1-01)

� The signs of the following physical quantities of legacy mechanics are negated

The time when an event occurs � t � �t

The velocity of the test particle � u � �u

The linear momentum of the test particle � P � �P

The angular momentum of the test particle � l � � l�

The spin of the test particle � s � � s

(1-02)

� - In one dimensional space not exist angular momentum, therefore for now we don’t discussed it.

Now we need to show that in one dimensional Armenian Theory of Relativity, in the case of time-reversal, all physicalquantities properties given by the table �1 � 01� and �1 � 02� are conserved. For that purpose in all Armeniantransformations equations and Armenian relativistic formulas we need to negate time �t � �t� and also need to make thefollowing operations related with time-reversal.

We need to negate all velocities in all inertial systems � u � �u

We need to keep the accelerations unchanged in all inertial systems � a � a

We need to negate the new time-space constant s in all inertial systems � s � �s

We need to keep the new time-space constant g unchanged in all inertial systems � g � g

(1-03)

Now using the time-reversal operation given by table �1 � 03�, we try to test, one by one, all transformations andrelativistic formulas derived by Armenian Theory of Relativity.

� In the case of time-reversal operation, reciprocal velocity formula stays invariant �1.7� 10�1, �5�2, �14�3

��v�� v�

1 � ��s� ��v�c

� v� � �v

1 � s vc

(1-04)

� In the case of time-reversal operation, Armenian gamma function quantity stays invariant �6�2, �16�3

�&��v� �

1

1 � ��s� ��v�c � g ��v�2

c2

�1

1 � s vc � g v2

c2

� �&�v� (1-05)

3 - 17


� In the case of time-reversal operation, Armenian time-space interval stays invariant �8�2, �18�3

'2��t,x� � ��ct�2 � ��s��ct�x � gx2 � �ct�2 � s�ct�x � gx2 � '2�t,x� (1-06)

� In the case of time-reversal operation, the mathematical form of the time-space coordinates Armeniantransformation equations stays invariant �4�2, �07�3

��t�� &��v� 1 � ��s� �

�v�c ��t� � g ��v�

c2x

x� � �&��v��x � ��v��t��

�

t� � �&�v� 1 � s v

c t � g vc2

x

x� � �&�v��x � vt�

(1-07)

� In the case of time-reversal operation, addition and subtraction formulas of velocities stays invariant�10�2, �19,20�3

��u� ��u�� v� � ��s�

��v��u��c

1 � g��v��u��

c2

��u�� u� � ��v�

1 � ��s� ��v�c � g ��v��u�

c2

�

u �u� � v � s vu�

c1 � g vu�

c2

u� �u � v

1 � s vc � g vu

c2

(1-08)

� In the case of time-reversal operation, Armenian Lagrangian formula stays invariant �18�2, �28�3

�&��u� � �m0c2 1 � ��s� �

�u�c � g ��u�2

c2� �m0c2 1 � s u

c � g u2

c2� �

&�u� (1-09)

� In the case of time-reversal operation, Armenian Lagrangian function transformations stays invariant�30�3

�&��u��

1 � ��s� ��v�c � g ��v�2

c2

1 � ��s� ��v�c � g ��v��u�

c2

�&��u�

�&��u� �

1 � ��s� ��v�c � g ��v�2

c2

1 � g��v��u��

c2

�&��u��

�

�&�u��

1 � s vc � g v2

c2

1 � s vc � g vu

c2

�&�u�

�&�u� �

1 � s vc � g v2

c2

1 � g vu�

c2

�&�u��

(1-10)

� In the case of time-reversal operation, Armenian energy quantity stays invariant �19�2, �31�3

E&��u� � �

&��u� 1 � 1

2��s� �

�u�c m0c2 � �

&�u� 1 � 1

2s u

c m0c2 � E&�u� (1-11)

� In the case of time-reversal operation, the sign of the Armenian linear momentum formula is negated�19�2, �31�3

P&��u� � ��

&��u� 1

2��s� � g ��u�

c m0c � � �&�u� 1

2s � g u

c m0c � �P&�u� (1-12)

4 - 17


� In the case of time-reversal operation, relation between Armenian energy and Armenian linearmomentum stays invariant �25�2, �34�3

c2P&2 ��u� � ��s�cP

&��u�E

&��u� � gE

&2 ��u� � g � 1

4 ��s�2 �m0c2�2 �

� c2P&2 �u� � scP

&�u�E

&�u� � gE

&2 �u� � �g � 1

4s2��m0c2�2

(1-13)

� In the case of time-reversal operation, Armenian energy-momentum transformation equationsstays invariant �24�2, �32,33�3

E&��u��

&��v� E

&��u� � ��v�P&��u�

P&��u��

&��v� 1 � ��s� �

�v�c P

&��u� � g ��v�c2

E&��u�

�

�

E&�u��

&�v� E

&�u� � vP

&�u�

P&�u

�� &�v� 1 � s v

c P&�u� � g v

c2E&�u�

(1-14)

� In the case of time-reversal operation, Armenian spatial (Newtonian) force derivation formulastays invariant &2 � 35

1

F&��u� �

dP&��u�

d��t��

�dP&�u�

�dt�

dP&�u�

dt� F

&�u� (1-15)

� In the case of time-reversal operation, Armenian spatial (Newtonian) force quantity stays invariant

&2 � 371, �45�3

F&��u� � � g � 1

4 ��s�2 m0�&3 ��u�a � � �g � 1

4s2�m0�&

3 �u�a � F&�u� (1-16)

� In the case of time-reversal operation, the sign of the scalar component of the Armenian force derivationformula is negated &2 � 36

1

F&0 ��u� � 1

cdE

&��u�

d��t�� 1

cdE

&�u�

�dt� � 1

cdE

&�u�

dt� �F

&0 �u� (1-17)

� In the case of time-reversal operation, the sign of the scalar component of the Armenian force quantity isnegated &2 � 38

1

F&0 ��u� � � g � 1

4��s�2 m0

��u�c �3��u�a � � g � 1

4s2 m0

uc �3�u�a � �F

&0 �u� (1-18)

Remark 1 - Dear readers, if we missed any transformation equations or any relativistic formulas, we hope that you

can easily use �1 � 03� and make the time-reversal operation, to prove that particular formula stays invariant or has thesign negated.

5 - 17


2 - Definition of Opposite Inertial Systems and

Only Space Reversal Phenomena Consideration

Now again lets write down all quantities of legacy mechanics, which in the case of spatial-inversion (in our article

mirror reflection about X axis) it either stays invariant or has its sign changed. Below you can see those physicalquantities.

� The following physical quantities of legacy mechanics stays invariant

The time when an event occurs � t � t

The mass of the test particle � m � m

The energy of the test particle � E � E

The angular momentum of the test particle � l � l�

The spin of the test particle � s � s

(2-01)

� - In one dimensional space not exist angular momentum, therefore for now we don’t discussed it.

� The following physical quantities of legacy mechanics have their signs negated

The position of the test particle � r � � r

The velocity of the test particle � u � �u

The acceleration of the test particle � a � �a

The linear momentum of the test particle � P � �P

The force on the test particle � F � �F

(2-02)

In the case of space reversal, Armenian transformation equations and formulas in general do not contradict the

physical quantity properties of legacy mechanics given by table �2 � 01� and �2 � 02�. However Armenian relativisticformulas gives a more detailed and fine description of that phenomena, which in the macro-world is mostly unobservablebut it plays a very significant role in the micro-world.

Now if we like to test all Armenian transformation equations and relativistic formulas for this space-reversal case, wefirst need to define the idea of opposite inertial systems and accordingly use this new notations for all physical quantities.In doing so we can easily distinguish whether those are located in the direct (not reversal) World or are located in theopposite (in reversal) World.

Lets assume we are given inertial system K, which we can conventionally call the direct inertial system. Now on theorigin of that inertial system, we place a two sided mirror perpendicular to the X axis, which can simultaneously reflectpositive and negative parts of the axis. This means that the positive axis of the direct inertial system K becomes anegative axis and the negative axis becomes a positive axis. This newly received inertial system becomes thetotal inversion of the given inertial system K, which we call the opposite inertial system. Then to distinguish between

these two inertial systems: direct inertial system and opposite inertial system, in Armenian Theory of Relativity, we use thefollowing notations �1.8� 2�1:

For direct inertial system K � K

For opposite inertial system K � K (2-03)

In order to be able to distinguish between all physical quantities for moving test particles in the direct inertial system

K and in the opposite inertial system K, we need to implement the following notations.

6 - 17


� In Armenian Kinematics �1.8� 3,4�1

In the K direct inertial system In the K opposite inertial system

For time � t

For spatial position � x

For velocity � u � dxd t

For acceleration � a � dud t

For Armenian interval ��'

�

For time � t

For spatial position � x

For velocity � u � dxd t

For acceleration � a � dud t

For Armenian interval �'

(2-04)

� In Armenian Dynamics &21


For action integral � *&

For Armenian Lagrangian � �& � �&

u

For Armenian energy � E& � E&

u

For Armenian momentum � P& � P&

u

For Armenian spatial force � F& �dP&

d t

For Armenian scalar force � F&0�

dE&

d t

�

For action integral � *&

For Armenian Lagrangian � �& � �&

u

For Armenian energy � E& � E&

u

For Armenian momentum � P& � P&

u

For Armenian spatial force � F& �dP&

d t

For Armenian scalar force � F&0�

dE&

d t

(2-05)

In a similar way for some other K� inertial system we can define direct and opposite inertial systems as well and usethe following notations �1.8� 2�1:

For direct inertial system K� � K�

For opposite inertial system K� � K�

(2-06)

As before, in order to distinguish between all physical quantities for the same moving test particle in the direct inertial

system K�

and in the opposite inertial system K�, we need to use the following notations similar to �2 � 04� and �2 � 05�.

� In Armenian Kinematics �1.8� 3,4�1

In the K�

direct inertial system In the K�

opposite inertial system

For time � t�

For spatial position � x�

For velocity � u�� dx

�

d t�

For acceleration � a�� du

�

d t�

For Armenian interval ��'�

�

For time � t�

For spatial position � x�

For velocity � u�� dx

�

d t�

For acceleration � a�� du

�

d t�

For Armenian interval �'

�

(2-07)

7 - 17


� In Armenian Dynamics &21

In the K�



For action integral � *&�

For Armenian Lagrangian � �&��

&u�

For Armenian energy � E&�� E

&u�

For Armenian momentum � P&�� P

&u�

For Armenian spatial force � F&��

dP&�

d t�

For Armenian scalar force � F&�0�

dE&�

d t�

�

For action integral � *&�

For Armenian Lagrangian � �&��

&u�

For Armenian energy � E&�� E

&u�

For Armenian momentum � P&�� P

&u�

For Armenian spatial force � F&��

dP&�

d t�

For Armenian scalar force � F&�0�

dE&�

d t�

(2-08)

Moreover, if K� inertial system has a relative velocity v with respect to the inertial system K, then we call it directrelative velocity and accordingly we denote it as v . Likewise if K inertial system has a relative velocity v� with respect tothe inertial system K�, which is physically the mirror reflected velocity of the direct relative velocity v and we naturallydenote it as v . Therefore for mutual relative velocities between K and K� inertial systems we use the followingnotations �1.8� 5�1:

For direct relative velocity � v � v

For reciprocal relative velocity � v � � v (2-09)

Since the reciprocal (inverse) velocity of the reciprocal relative velocity is exactly the same as the direct relativevelocity, therefore we can record that physical fact in the usual way or by the way of vector sign notation �15�3:

�v�� v or

v � v (2-10)

Remark 2 - From the definition that the opposite inertial system is the full (left and right side) reflection of the direct

inertial system, in legacy mechanics (classical and relativistic) it means that the physical quantities that have a directionhave their signs reversed (except angular momentum and spin), while all scalar physical quantities do not change theirsign �2 � 01,02�. Also, the absolute values of all the direct and reflected physical quantities (scalar or vector) are equal toeach other. However that is not the case in Armenian Theory of Relativity, where for some physical quantities that iscorrect but for some other physical quantities (scalar or vector) that is incorrect. Below is a list (not full) of unchanged andchanged physical quantities.

� The physical quantities, whose absolute values in Armenian Theory of Relativity in the case of mirrorreflection stays unchanged

Position coordinates � x � x

Armenian interval �' �

�'

Least action integral � *& � *&

Armenian energy � E& � E&

Armenian spatial force � F& � F&

(2-11)

8 - 17


� The physical quantities, whose absolute values in Armenian Theory of Relativity in the case of mirrorreflection are changed

Time interval of the event � t � t

Movement velocities � u � u

Movement accelerations � a � a

Armenian Lagrangians � �& � �&

Armenian linear momentums � P& � P&

Armenian scalar force � F&0

� F&0

(2-12)

Remark 3 - The absolute value inequalities of direct and mirror reflected physical quantities, given by table

�2 � 12�, is specific only for Armenian Theory of Special Relativity, whose results come as a complete surprise for legacyphysics. These miraculous properties of physical quantities opens Pandora’s box of the Universe and outlines a newhorizon for future technology.

As we have already mentioned in the introduction, the two new universal constants s and g in Armenian Theory ofRelativity in the case of mirror reflection stays unchanged. But that is not enough, we also need to know how thefundamental physical quantities such as time, space, velocity and acceleration are changed in the case of P-symmetry(mirror reflection). Thanks to Armenian Theory of Relativity, we have a complete solution to all those questions.

In the case of only space reversal (in our article mirror reflection) the static time and space coordinates and theirdifferentials Armenian transformation equations in the K and K� inertial systems have the following form.

� In the case of mirror reflection Armenian transformations of the time-space coordinates in theK inertial system �1.8� 15,17�1- �12�2- �06�3

c t � c t � sx

x � � x�

c t � c t � sx

x � � x (2-13)

� In the case of mirror reflection Armenian transformations of the time-space coordinates differentials inthe K inertial system �1.8� 16,18,19�1

d t � 1 � s uc d t

dx � �dx�

d t � 1 � s uc d t

dx � �dx (2-14)

� In the case of mirror reflection Armenian transformations of the time-space coordinates in theK� inertial system �1.8� 15,17�1

c t�

� c t�� sx

�

x�

� � x�

�c t

�� c t

�� sx

�

x�

� � x�

(2-15)

� In the case of mirror reflection Armenian transformations of the time-space coordinates differentials inthe K� inertial system �1.8� 16,18,19�1

d t�

� 1 � s u�

c d t�

dx�

� �dx�

�d t

�� 1 � s u

�

c d t�

dx�

� �dx�

(2-16)

9 - 17


Only in the case of mirror reflection, from moving test particle time-space coordinates differentials transformationequations, we can obtain the formula for the reflected opposite velocities in the K and K� inertial systems. For thatpurpose we need to use �2 � 14� and �2 � 16� system of the equations, dividing second equations by the first equations.Armenian reciprocal (reflected) velocity formula is completely different from the legacy physics corresponding reciprocal

velocity formula u � � u . Moreover Armenian opposite velocity formulas is applicable for relative velocity and for the

test particle arbitrary velocity as well.

� Armenian formulas for direct and opposite (mirror reflected) velocities in the inertial systems K and K�

have the following form, but their absolute values do not equal each other �1.8� 6,8�1

In the K inertial system In the K� inertial system

u � �u

1 � s uc

u � �u

1 � s uc

�

u��

u�

1 � s u�

c

u��

u�

1 � s u�

c

(2-17)

� Direct and opposite velocities satisfy the following relation �1.8� 9�1

1 � s uc 1 � s u

c � 1 (2-18)

� Armenian gamma functions in the direct and opposite inertial systems have the same mathematicalform, but they are not equal to each other �1.9� 30�1, �6�2, �16�3

Armenian gamma function in the direct inertial system � �&

v �1

1 � s vc � g v

2

c2

� 0

Armenian gamma function in the opposite inertial system � �&

v �1

1 � s vc � g v

2

c2

� 0

(2-19)

� In the direct and opposite inertial systems between corresponding gamma functions, there exists thefollowing very important relations �1.9� 31,32�1,�7�2,�17�3

�&

v v � ��&

v v

�&

v � �&

v 1 � s vc � 0

�

�&

v v � ��&

v v

�&

v � �&

v 1 � s vc � 0

(2-20)

� There also exists the following symmetric relation &1 � 251, �17�3

�&

v 1 � 12

s vc � �

&v 1 � 1

2s v

c (2-21)

� There exists the following interesting relation as well �1.8� 24�1, �6�2

�&

v �&

v �1 � s v

c

1 � s vc � g v

2

c2

�1 � s v

c

1 � s vc � g v

2

c2

�1

1 � g v vc2

� 0 (2-22)

10 - 17


� In the case of space reversal, the mathematical form of the Armenian formula for addition andsubtraction of velocities stays unchanged �1.8� 29,30�1

In the direct inertial systems In the opposite inertial systems

u �u�� v � s v u

�

c

1 � g v u�

c2

u��

u � v

1 � s vc � g v u

c2

�

u �u�� v � s v u

�

c

1 � g v u�

c2

u��

u � v

1 � s vc � g v u

c2

(2-23)

� In the case of space reversal, the mathematical form of the Armenian gamma functions transformationsequations stays unchanged �1.8� 33,34�1

�&

u�

� �&

v �&

u 1 � s vc � g v u

c2

�&

u � �&

v �&

u�

1 � g v u�

c2

�

�&

u�

� �&

v �&

u 1 � s vc � g v u

c2

�&

u � �&

v �&

u�

1 � g v u�

c2

(2-24)

� In the case of space reversal, the mathematical form of the product Armenian gamma functions andcorresponding velocities stays unchanged �1.8� 33,34�1

�&

u�

u��

&v �

&u u � v

�&

u u � �&

v �&

u�

u�� v � s v u

�

c

�

�&

u�

u��

&v �

&u u � v

�&

u u � �&

v �&

u�

u�� v � s v u

�

c

(2-25)

Since we now know that in Armenian Theory of Relativity, in the case of only mirror reflection, how time-space

�2 � 13,15� and the velocity �2 � 17� transforms, and we also know the relation between the direct and opposite gammafunctions �2 � 20�, then we need to find out how time-space coordinates between two inertial systems transforms.

� Armenian direct and inverse transformation equations between two ( K and K�) direct (not reflected)

inertial systems �1.8� 25�1- �4�2, �07,08�3

Armenian direct transformations Armenian inverse transformations

t��

&v 1 � s v

c t � g vc2

x

x��

&v x � v t

and

t � �&

v 1 � s vc t

�� g v

c2x�

x � �&

v x�� v t

�

(2-26)

Remark 4 - Using relations �2 � 20�, from Armenian direct transformation equations �2 � 26� we can easily obtain

Armenian inverse transformation equations. Therefore there is no contradiction.

Now using transformation equations �2 � 26� and static mirror reflection transformations �2 � 13� and �2 � 15�, we can

obtain Armenian transformation equations between two ( K and K�) opposite (full reflected) inertial systems, as you can

see below.

11 - 17


� Armenian direct and inverse transformation equations between two ( K and K�) opposite (full reflected)

inertial systems

Armenian direct transformations Armenian inverse transformations

t��

&v 1 � s v

c t � g vc2

x

x��

&v x � v t

andt � �

&v 1 � s v

c t�� g v

c2x�

x � �&

v x�� v t

�

(2-27)

Remark 5 - We can also obtain Armenian transformation equations �2 � 27� from Armenian transformation

equations �2 � 26� by just changing the vector notation sign to the opposite direction in all physical quantities.

There is some special interest to write down Armenian transformation equations between two different polarity inertialsystems, such as between direct and reflected inertial systems or between reflected and direct inertial systems. Belowyou can see Armenian transformation equations between two such mixed inertial systems.

� Armenian direct and inverse transformation equations between opposite K�

and direct K inertialsystems

c t��

&v c t � s � g v

c x

x��

&v x � v t

andc t � �

&v c t

�� s � g v

c x�

x � ��&

v x�� v t

� (2-28)

� Armenian direct and inverse transformation equations between direct K�

and opposite K inertialsystems

c t��

&v c t � s � g v

c x

x��

&v x � v t

andc t � �

&v c t

�� s � g v

c x�

x � ��&

v x�� v t

� (2-29)

� From �2 � 26� and �2 � 27� we can obtain the following time differential’s relations �1.10� 8�1

d t�

d t� �

&v 1 � s v

c � g v uc2

d t�

d t� �

&v 1 � s v

c � g v uc2

and

d t

d t��

&v 1 � s v

c � g v u�

c2

d t

d t��

&v 1 � s v

c � g v u�

c2

(2-30)

� From �2 � 28� and �2 � 29� we can also obtain the following time differential’s relations

d t�

d t� �

&v 1 � s u

c � g v uc2

d t�

d t� �

&v 1 � s u

c � g v uc2

and

d t

d t��

&v 1 � s u

�

c � g v u�

c2

d t

d t��

&v 1 � s u

�

c � g v u�

c2

(2-31)

� In the case of space reversal (mirror reflection), the Armenian interval stays invariant �1.9� 40�1

'2 t , x � c t2� s c t x � gx

2� c t � sx

2� s c t � sx �x � g �x

2�

� c t2� s c t x � gx

2� '2 t , x

(2-32)

12 - 17


� Armenian formulas for direct and opposite (mirror reflected) accelerations in the inertial systems K andK� have the following form, but their absolute values do not equal each other &2 � 3

1, �24�3

Between K and K inertial systems Between K�

and K�

inertial systems

a � � 1

1 � s uc

3a

a � � 1

1 � s uc

3a

and

a�� 1

1 � s u�

c

3a�

a�� 1

1 � s u�

c

3a�

(2-33)

� In direct and reflected inertial systems, the test particle’s direct and reflected accelerations �2 � 33�satisfy the following relations &2 � 4

1


and K�

inertial systems

�&3 u a � ��

&3 u a and �

&3 u

�a��

&3 u

�a�

(2-34)

� Test particle accelerations transformations between two ( K and K� ) inertial systems &2 � 51, �16�2,

�25�3

Between K and K�

direct inertial systems Between K and K�

opposite inertial systems

a �1

�&3 v 1 � g v u

�

c2

3a�

a��

1

�&3 v 1 � s v

c � g v uc2

3a

�

a �1

�&3 v 1 � g v u

�

c2

3a�

a��

1

�&3 v 1 � s v

c � g v uc2

3a

(2-35)

� Test particle accelerations invariant relations between two inertial systems K and K� &2 � 61

Between K and K�



�&3 u a � �

&3 u

�a�

� �&3 u a � �

&3 u

�a�

(2-36)

� According to �2 � 36�, for test particle we can define a special acceleration (direct or opposite), callingthem - Armenian acceleration, which stays invariant ether between two direct inertial systems or between

two opposite inertial systems &2 � 71, �26�3

a& � �&3 u a � �

&3 u

�a�

� a&�

a& � �&3 u a � �

&3 u

�a�

� a&�

(2-37)

� Also according to �2 � 34�, these Armenian accelerations satisfy the following conditions &2 � 81, �27�3

a& � � a&

a&�� a&

� (2-38)

13 - 17


� We can also define the Armenian rest mass the following way &2 � 91, �21�2, �44�3

m&0

� ��g � 14

s2�m0 � 0 (2-39)

� In Armenian mechanics, in the case of space reversal, the least action integrals in K and K� inertial

systems have the same mathematical form &2 � 22,231

In the K and K inertial systems In the K�

and K�

inertial systems

*& � �m0c2t 2

t 1

� 1 � s uc � g u

2

c2d t

*& � �m0c2t 2

t 1

� 1 � s uc � g u

2

c2d t

and

*&�� m0c2

t 2

�

t 1

�

� 1 � s u�

c � g u�2

c2d t

�

*&�� m0c2

t 2

�

t 1

�

� 1 � s u�

c � g u�2

c2d t

�

(2-40)

� Using �2 � 14�, �2 � 16�, �2 � 20�, �2 � 24� and �2 � 30� formulas we can prove that least action integralquantity �2 � 40� is invariant for all direct and opposite inertial systems &2 � 24

1

*& � *& � *&�

� *&�

� *&

(2-41)

� In Armenian mechanics, in the case of space reversal, the Armenian Lagrangian formulas mathematical

form in K and K� inertial systems are invariant but do not equal each other &2 � 22,231

In the K and K inertial systems In the K�

and K�

inertial systems

�& � �&

u � �m0c2 1 � s uc � g u

2

c2

�& � �&

u � �m0c2 1 � s uc � g u

2

c2

and

�&��

&u�

� �m0c2 1 � s u�

c � g u�2

c2

�&��

&u�

� �m0c2 1 � s u�

c � g u�2

c2

(2-42)

� In Armenian mechanics, in the case of space reversal, Armenian Lagrangian formulas �2 � 42� between

K and K� inertial systems (direct and opposite) transform in the following way &2 � 251, �29�3


and K�

inertial systems

�&

u ��&

u

1 � s uc

�&

u ��&

u

1 � s uc

and

�&

u�

��&

u�

1 � s u�

c

�&

u�

��&

u�

1 � s u�

c

(2-43)

14 - 17


� Armenian Lagrangian function transformation equations between two ( K and K� ) direct and oppositeinertial systems &2 � 261 , �30�3

Between K and K�



�&

u�

�

1 � s vc � g v

2

c2

1 � s vc � g v u

c2

�&

u

�&

u �

1 � s vc � g v

2

c2

1 � g v u�

c2

�&

u�

�

�&

u�

�

1 � s vc � g v

2

c2

1 � s vc � g v u

c2

�&

u

�&

u �

1 � s vc � g v

2

c2

1 � g v u�

c2

�&

u�

(2-44)

� Armenian energy and Armenian momentum formulas in the direct and opposite inertial systemsK and K &2 � 27

1


E& � E&

u �1 � 1

2s u

c

1 � s uc � g u

2

c2

m0c2

P& � P&

u � �12

s � g uc

1 � s uc � g u

2

c2

m0c

�

E& � E&

u �1 � 1

2s u

c

1 � s uc � g u

2

c2

m0c2

P& � P&

u � �12

s � g uc

1 � s uc � g u

2

c2

m0c

(2-45)

� Armenian energy and Armenian momentum formulas in the direct and opposite inertial systems

K�

and K�

In the K�



E&�� E

&u�

�1 � 1

2s u

�

c

1 � s u�

c � g u�2

c2

m0c2

P&�� P

&u�

� �12

s � g u�

c

1 � s u�

c � g u�2

c2

m0c

�

E&�� E

&u�

�1 � 1

2s u

�

c

1 � s u�

c � g u�2

c2

m0c2

P&�� P

&u�

� �12

s � g u�

c

1 � s u�

c � g u�2

c2

m0c

(2-46)

� Armenian energy and Armenian momentum direct and inverse transformation equations between K

and K�

inertial systems &2 � 321, �24�2, �32,33�3

Direct transformations Inverse Transformations

E&��

&v E& � v P&

P&��

&v 1 � s v

c P& � g vc2

E&

and

E& � �&

v E&�� v P&

�

P& � �&

v 1 � s vc P&

�� g v

c2E&�

(2-47)

15 - 17


� The test particle full energy Armenian formula &2 � 331, �25�2, �34�3

P&2� sP& 1

c E& � g 1c E&

2� P&

� 2

� sP&� 1

c E&�

� g 1c E&

� 2

� �g � 14

s2��m0c�2

P&2� sP& 1

c E& � g 1c E&

2� P&

� 2

� sP&� 1

c E&�

� g 1c E&

� 2

� �g � 14

s2��m0c�2

(2-48)

� Relation between direct and opposite (reflected) Armenian energy and momentum quantities &2 � 281

E& � E& � E&

P& � � P& � s 1c E

&

andE&�� E&

�� E

&�

P&�� P&

�� s 1

c E&�

(2-49)

� Differentiating Armenian linear momentum formulas �2 � 45� and �2 � 46� with respect to time, we obtainspatial components of the Armenian force formulas in direct and opposite inertial systems &2 � 35,37

1

In the K and K�

direct inertial systems In the K and K�


F& � ��g � 14

s2�m0�&3 u a

F&�� g � 1

4s2�m0�&

3 u�

a�

�F& � ��g � 1

4s2�m0�&

3 u a

F&�� g � 1

4s2�m0�&

3 u�

a�

(2-50)

� Likewise, differentiating Armenian energy formulas �2 � 45� and �2 � 46� with respect to time, we obtainscalar components of the Armenian force formulas in direct and opposite inertial systems &2 � 36,38

1

In the K and K�



F&0� ��g � 1

4s2�m0

uc �

&3 u a � u

c F&

F&�0� ��g � 1

4s2�m0

u�

c �&3 u

�a�� u

�

c F&�

�F&

0� ��g � 1

4s2�m0

uc �

&3 u a � u

c F&

F&�0� ��g � 1

4s2�m0

u�

c �&3 u

�a�� u

�

c F&�

(2-51)

� In Armenian Theory of Special Relativity Newton’s second law can be preserved, if instead of legacyforce we use spatial components of Armenian force �2 � 50�, instead of legacy rest mass we use Armenianrest mass �2 � 39� and finally instead of legacy acceleration we use Armenian acceleration �2 � 37�.

We can call this the Armenian interpretation of Newtonian mechanics.

In the K and K�



F& � ��g � 14

s2�m0�&3 u a � m

&0a&

F&�

� ��g � 14

s2�m0�&3 u

�a�

� m&0

a&�

F& � ��g � 14

s2�m0�&3 u a � m

&0a&

F&�

� ��g � 14

s2�m0�&3 u

�a�

� m&0

a&

(2-52)

� From �2 � 38� and �2 � 52� it follows that in Armenian Theory of Special Relativity Newton’s first and thirdlaws are also preserved (Armenian interpretation) &2 � 40

1, �46�3

First law of the Newtonian mechanics Third law of the Newtonian mechanics

F& � F&�

F& � F&�

�F& � �F&

F&�� F&

�

(2-53)

16 - 17


Conclusions

If we denote time reversal and space reversal operations by the following notations:

Only time reversal operation � T

Only space reversal operation � P � Rx�

Time and space reversal operations together � TRx or RxT

(C-1)

� - In one dimensional space, space-reversal operation is equivalent of mirror reflection about X axis.

Then the concise list of our obtained results in Armenian Theory of Relativity can be seen in the following table:

Time and space reversal transformations � T P � Rx TRx � RxT

Time-space asymmetry coefficient � �s � s � �s

Time-space metric coefficient � g � g � g

The test particle event time � �t � t � s 1c x � � t � s 1

c x

The test particle position � x � �x � �x

The test particle mass � m � m � m

The test particle velocity � �u � �u

1 � s uc

�u

1 � s uc

The test particle acceleration � a � � 1

1 � s uc

3a � � 1

1 � s uc

3a

The test particle Armenian Lagrangian � � ��

1 � s uc

��

1 � s uc

The test particle Armenian energy � E � E � E

The test particle Armenian linear momentum � �P � �P � s 1c E � P � s 1

c E

The Armenian spatial force � F � �F � �F

The Armenian scalar force � �F0 � F0

1 � s uc

� F0

1 � s uc

(C-2)

The laws of legacy mechanics have always shown complete symmetry between the left and the right. As you can seefrom table C-2 , in Armenian Theory of Relativity there does not exist legacy mechanics mirror symmetry properties and

instead there exists complete irregularities. But in Armenian Theory of Relativity the left and right sides are notdistinguishable either (as you may have thought) and existing asymmetry is relative because doing the same

space-reversal operation two times, brings the particle in the same original state and that is true for each inertial system(direct or opposite).

This is not a violation of parity but this is the new way to define the P-symmetry in asymmetric theory of relativity.

Armenian relativistic formulas is full of asymmetry, which is in every single formula because of coefficient asymmetrys and that asymmetry is the essence and exciting part of the Armenian Theory of Relativity and therefore we demand arevision of all legacy mechanics under these remarkable new circumstances.

The time has also come to reopen NASA’s BPP program, but this time using our everywhere existing Armenianasymmetric formulas. This will lead us to harness infinite energy from rest particle’s momentum just as we harness energyfrom the wind using a windmill. Going in this path will bring forth the dawn of a new technological era.

References

1. "Armenian Theory of Special Relativity - One Dimensional Movement", Uniprint, June, 2013, Aryvan2. "Armenian Theory of Special Relativity", Infinite Energy, Volume 20, Issue 115, 2014, USA3. "Armenian Theory of Special Relativity Illustrated", academia.edu, archive.org,..., June, 2014

17 - 17

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