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From Nikolay Umov E=kmc^(2) via Albert Einstein’s E=γmc^(2) to the Dark Energy Density of the Cosmos E=(21 22)mc^(2)
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作者 Mohamed S.El Naschie 《World Journal of Mechanics》 2018年第4期73-81,共9页
The paper starts from the remarkable classical equation of the great nineteenth century Russian physicist Nikolay Umov E=kmc2 where 1/2&le;k&le;1, m is the mass, c is the speed of light and E is the equivalent... The paper starts from the remarkable classical equation of the great nineteenth century Russian physicist Nikolay Umov E=kmc2 where 1/2&le;k&le;1, m is the mass, c is the speed of light and E is the equivalent energy of m. After a short but deep discussion of the derivation of Umov we move to Einstein’s formula E=&gamma;mc2?where &gamma;is the Lorentz factor of special relativity and point out the interesting difference and similarity between Umov’s k and Lorentz-Einstein &gamma;. This is particularly considered in depth for the special case which leads to the famous equation?E=mc2?that is interpreted here to be the maximal cosmic energy density possible. Subsequently we discuss the dissection of E=mc2 into two components, namely the cosmic dark energy density E(D)=(21/22)MC2 and the ordinary energy density E(O)=MC2/22? where?E(D)+E(O)=MC2. Finally we move from this to the three-part dissection where we show that E is simply the sum of pure dark energy E(PD) plus dark matter energy E(DM) as well as ordinary energy E(O). 展开更多
关键词 n.umov Energy A.Einstein Energy El Naschie Energy Ordinary Cosmic Energy Cosmic Dark Energy F.Hasenohrl’s Electromagnetic Energy H.Poincaré History of Special Relativity
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