DERIVATION OF THE LORENTZ-EINSTEIN TRANSFORMATION VIA ONE OBSERVER

محتوى المقالة الرئيسي

O.M. AL-Kazalchi
Faiz T. Omara

الملخص

Lorentz-Einstein transformation derived by Einstein in his theory of special relativity. Physical laws and principles are invariant in all Galilean reference frames under this transformation. The transformation in every day use in a host of contexts as in free solution of the Dirac equation in the modern field of heavy ion in atomic physics. Most books on theoretical physics and special theory of relativity and all research papers have derived the Eorentz-Einstein transformation using various propositions and employing two observers each located in Galilean system with relative motion receding the same events in the space-time manifold. This paper derives Lorentz-Einstein transformation by proposing just one observer using local coordinates of two Galilean system with relative motion following the track of a spherical pulse of light, which to our knowledge is not found in the literature.

تفاصيل المقالة

كيفية الاقتباس
"DERIVATION OF THE LORENTZ-EINSTEIN TRANSFORMATION VIA ONE OBSERVER" (2010) مجلة الهندسة, 16(03), ص 5392–5397. doi:10.31026/j.eng.2010.03.08.
القسم
Articles

كيفية الاقتباس

"DERIVATION OF THE LORENTZ-EINSTEIN TRANSFORMATION VIA ONE OBSERVER" (2010) مجلة الهندسة, 16(03), ص 5392–5397. doi:10.31026/j.eng.2010.03.08.

تواريخ المنشور

المراجع

 Tensor Analysis o I.S. Sokolnikoff o New york. John Willy and sons 1 nc. o London 1951. pp  The theory of relativity o R. K. Pathria o Pergamon press, Oxford 1 974.  A. Einstein, The meaning of relativity. Second edition 1 956.  O. M. AL- Kazalchi: An alternative approach to the second postulate of the special theory of relativity.  . يجهت انه ذُست وانتك هُىحيا انجايعت انتك هُىجيت انعذد 4 ان جًهذ انخا يَ عشز 3991

 W. Gresnier: (1997) Relativistic Quantum Mechanics, Wave equations  springer  Weirnstrock: Derivation of the Lorentz equations without a linearty  assumption. Amer. J. Phy. 32 (1964). 260-264.  G. Nadean: The Lorentz-Einstein transformation obtained by vector method.  Amer. J. Phy. 30 (1962) 602-3.

 O. M. AL- Kazalchi: New method for derivation of Lorentz

transformation.  Journal of Eng., College of Engineering  University of Baghdad No. 1 Vol.9 march 2002.  Moller, C (1972): The theory of relativity. Oxford clarendon press.  G. J. Whitrow: A derivation of the Lorentz formulas. Quant. J. math. 4(1933).

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