Did any physics experts expect SUPERRELATIVITY paper, a physics revolution producing the\nEINSTEIN-RODGERS RELATIVITY EQUATION, producing the HAWKING-RODGERS BLACK HOLE\nRADIUS, and producing the STEFAN-BOLTZMANN-SCHWARZSCHILD-HAWKING-RODGERS BLACK\nHOLE RADIATION POWER LAW, as the author gave a solution to The Clay Mathematics Instituteââ?¬â?¢s\nvery difficult problem about the Navier-Stokes Equations? The Clay Mathematics Institute in May\n2000 offered that great $million prize to the first person providing a solution for a specific statement\nof the problem: ââ?¬Å?Prove or give a counter-example of the following statement: In three space\ndimensions and time, given an initial velocity field, there exists a vector velocity and a scalar\npressure field, which are both smooth and globally defined, that solve the Navier-Stokes Equations.ââ?¬Â\nDid I, the creator of this paper, expect SUPERRELATIVITY to become a sophisticated conversion\nof my unified field theory ideas and mathematics into a precious fluid dynamics paper to\nhelp mathematicians, engineers and astro-physicists? [1]. Yes, but I did not expect such superb\nequations that can be used in medicine or in outer space! In this paper, complicated equations for\nmulti-massed systems become simpler equations for fluid dynamic systems. That simplicity is\nwhat is great about the Navier-Stokes Equations. Can I delve deeply into adding novel formulae\ninto the famous Schwarzschildââ?¬â?¢s equation? Surprisingly, yes I do! Questioning the concept of reversibility\nof events with time, I suggest possible 3-dimensional and 4-dimensional co-ordinate\nsystems that seem better than what Albert Einstein used, and I suggest possible modifications to\nMaxwellââ?¬â?¢s Equations. In SUPERRELATIVITY, I propose that an error exists in Albert Einsteinââ?¬â?¢s Special\nRelativity equations, and that error is significant because it leads to turbulence in the universeââ?¬â?¢s\nfluids including those in our human bodies. Further, in SUPERRELATIVITY, after I create\nSchwarzschild-based equations that enable easy derivation of the Navier-Stokes Equations, I suddenly\ncreate very interesting exponential energy equations that simplify physics equations, give a\nmathematical reason for turbulence in fluids, give a mathematical reason for irreversibility of\nevents with time, and enable easy derivation of the Navier-Stokes Equations. Importantly, my new\nexponential Navier-Stokes Equations are actually wave equations as should be used in Fluid Dynamics.\nThrilled by my success, I challenge famous equations by Albert Einstein and Stephen\nHawking [2] [3].
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