Black Hole The Shock
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Black Hole The Shock
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Peter Donald Rodgers 1,2
1 Mathematics, University of Queensland, Brisbane, Australia . 2 2014 Genius of the Year-Asia, World Genius Directory, Internet .
DOI: 10.4236/jamp.2016.412221
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Rodgers, P. (2016) Black Hole Shock. Journal of Applied Mathematics and Physics , 4 , 2301-2320. doi: 10.4236/jamp.2016.412221 .
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Black Hole Shock unites relativity and quantum physics. The mysterious Navier-Stokes Equations, of my recent Superrelativity, inspired me to think deeper about physics equations. The Clay Mathematics Institute Millennium contest has motivated me to create two unique physics papers, Superrelativity and Black Hole Shock, which have raised my interest in fluid dynamics. An enormous amount of effort went into creating mathematics of Superrelativity. After that effort, I was hallucinating extremely long equations, and following intellectual tangents that led to five significant Black Hole Shock equations: (a) Klein-Gordon-Schrodinger-Rodgers Equation, (b) Einstein-Rodgers’s Mass-Wave-Energy 4 Equivalence Equation, (c) Einstein-Schwarzschild-Klein-Gordon-Schrodinger-Rodgers Mass-Hyperacceleraton Geometry, (d) Einstein-Klein-Gordon-Schrodinger-Stefan-Boltzmann-Schwarzs-child-Hawking-Rodgers Black Hole Radiation Equation, and (e) Improved Hawking-Rodgers Radius of a Black Hole. My paper Black Hole Shock indicates that our current coordinate, dimensional, geometrical systems need to be radically improved. In this paper, mathematics ends the concept of duality of a particle and shows everything is electro-magnetic.
1.1. Introduction: Superrelativity before Black Hole Shock
Black Hole Shock, introducing my new concept of coordinate geometry, is my mathematical obsession now because a brilliant idea flashed like lightning into my brain after publication of my Superrelativity paper [ 1 ] . An explanation of Black Hole Shock’s history will help physics enthusiasts to comprehend my ideas and equations involved. Very radical ideas and equations flowed out in the fluid dynamics of Superrelativity that seemed impossible for me to surpass. More radical is my new physics paper named Black Hole Shock. Its coordinate system will surprise physicists.
1.2. Introduction: Open Journal of Fluid Dynamics Published Superrelativity
Recently, Open Journal of Fluid Dynamics published my Superrelativity paper that included exciting equations which were modifications of those by Navier, Stokes, Einstein, and Hawking. Such revolutionary equations inspire physicists to comprehend reality better. These revelatory equations, created to derive the Navier-Stokes Equations, for a possible Clay Mathematics Institute Millennium Prize, stirred attention from some inventors [ 2 ] . Creative UFT ideas had been eloquently put into fluid dynamics equations. What I achieved, though not ultimate perfection, was extremely difficult to achieve, and was revelatory for fluid dynamics enthusiasts. What I intend to do, in Black Hole Shock, is to improve those equations, or to progress from those equations. I want to reconsider my use of Schwarzschild’s method, and attempt to better understand quantum aspects of physics. Einstein’s relativity mathematics has always been my forte as I ignore Quantum Physics. The Klein-Gordon Equation and the Schrodinger’s Equation deserve mathematical impact from me.
1.3. Introduction: Reversibility or Irreversibility & Fallibility or Infallibility
The famous Schwarzschild’s equation inspired me to go mathematically creative; so did my search for irreversibility of events with time [ 3 ] [ 4 ] [ 5 ] [ 6 ] . 4-D and 3-D gave good results! Is Einstein fallible? Is Maxwell fallible? Maxwell’s Equations became eight Maxwell-Rodgers Equations to help us rethink the basic concepts of physics. I suspected that I used too many aspects in the Z of my Schwarzschild’s Equation. A fun guy, I love creating my own new coordinate systems for reversibility or irreversibility. Maxwell’s Equations have usually helped physicists, but they have also limited them because the equations are not 100% correct.
1.4. Introduction: Turbulence & Inexplicable Realities
Many years of fishing and watching rivers flow caused me to be thrilled by my discovery about why turbulence existed―something fascinating I had tried to explain when I was a child. Fun-loving surf-board riders really ride on waves, following equations in fluid dynamics. Waves permeate through our universe. The mathematics delved into physics is superb reality beyond full comprehension-genius mathematics not entirely understood by human geniuses. Albert Einstein and Stephen Hawking, despite their high IQs, could not be infallible about this extraordinary complexity of mathematical physics [ 7 ] . My difficult equations progressed due to scribbled nonsensical possibilities on thousands of pieces of papers that I screwed up and hurled at cockroaches. Physics can be funny, wild conjecture about the inexplicable realities of this universe. You and I, we are also inexplicable realities of this universe.
1.5. Introduction: Mysterious Navier-Stokes Equations
The famous Navier-Stokes Equations have been a mystery for 180 years because nobody has known how to derive those equations from basics. A solution to this mystery will advance fluid dynamics immensely [ 8 ] [ 9 ] . Superrelativity might be accepted as a prize-worthy solution. Fluid dynamics is very important for engineers, physiologists, cosmologists and you. Plants and animals, including humans, consist of fluids essential to sustain life. Fluid dynamics is about inanimate and animate existences. Fluid dynamic equations are more universal than many believe they are. Any unified field theory must provide the Navier-Stokes Equations. I did not realise that until I created Superrelativity as my attempt to win the Clay Mathematics Institute Millennium Prize for the derivation of the Navier-Stokes Equations.
1.6. Introduction: Gravito-Electro-Magnetic Waves
Superrelativity moves mathematically from my UFT equations into the Schwarz- schild’s metric equation, and then into the functional Navier-Stokes Equations of fluid dynamics [ 1 ] [ 8 ] [ 10 ] . Gravito-electro-magnetic waves were suggested in my previous UFT papers. Realise that I am a gravito-electro-magnetic mathematician, writing this physics paper for gravito-electro-magnetic you! But, for many years, I have considered gravito-electro-magnetism to be electro-magnetism with variable permittivity. Is it possible that mass is misunderstood? Does mass exist?
1.7. Introduction: Viscosity & Relativity
Viscosity is a mystery [ 11 ] . Brilliant physicists must judge whether my conception of viscosity is valid for the Millennium prize. My Superrelativity exponential equations are impressive wave equations appropriate for fluid dynamics. Four dimensions are easy because most physicists learnt about four dimensions. Four seems to be a magic number, but I hope it is not a tragic number that has led dimensional physics astray. Four dimensions were used by Albert Einstein, so physicists obsessively followed his example, and based their PhD papers on relativity mathematics. Are there more dimensions? Are there fewer dimensions? How many coordinates exist? Are humans intelligent enough to actually decipher the innate equations of this universe? Against the odds, be positive!
1.8. Introduction: Schwarzschild’s Metric Equation to Superrelativity
Relativity does not match reality because relativity does not include acceleration, relativity uses a constant velocity of light rather than a variable velocity, and relativity gives reversibility of events with time though irreversibility is what happens. Irreversibility is important in Superrelativity, as are the eight Maxwell-Rodgers Equations. A very significant fact is that light-rays are bent by both mass and charge. That fact implies that the Schwarzschild’s metric equation is appropriate for light going past a mass or a charge. This revelation was important for creation of my UFT ideas and Superrelativity. My expertise with advanced multi-massed equations enabled extremely long, multi- symbolled equations to develop in my brain and on paper. This lover of light needs to think more deeply about what bends lightrays because this might mean my Superrelativity equations need to be modified. No physics equation is ever perfect, just nearly perfect like its physics theorist.
1.9. Introduction: Expansion of Famous Physics Ideas
Some geniuses love my Superrelativity equations. My exciting exponential equations include aspects from the kinetic theory of gases. The variable velocity of light, that I use, can be constant if you imagine that. The struggle to describe reality inspired my expansion of famous ideas of Albert Einstein, Stephen Hawking, and other brilliant physicists [ 12 ] [ 13 ] . But I am not 100% satisfied, because satisfaction stops mathematical progression. Further, possible errors are my wild obsessions in my equations. To create a UFT, a person must be an obsessive-compulsive mathematician like me. Possibly crazy! Those wild obsessions excite me to create Black Hole Shock.
1.10. Introduction: Search for Simplistic Universal Structure
What I strived to achieve was to conglomerate very many physics ideas effectively into a simplistic universal structure [ 7 ] . My search for the unified field theory of physics had started this quest that never ends. Superrelativity contains a list of many preliminary physics papers of my original mathematics I wrote as my hobby. Richard Lawrence Norman inspired me to more effort by publishing them in Mind Magazine on the internet for free. Being an independent creative-thinker enabled me to follow any intellectual tangent I wanted to follow. All of my mathematics was original, but not all of my words, because I was a dyslexic mathematician. All I knew was equations. Sometimes, I think physicists do not place enough emphasis on the equations of physics. They are attempting to communicate too many difficult ideas to non-mathematical people who should become mathematical. In Superrelativity and now in Black Hole Shock, this calculus freak includes mathematics that only geniuses will really understand. You might not realise that I have attempted to lay the explanations out simply by using mathematical progressions.
1.11. Introduction: UFT Equations to Navier-Stokes Equations
Superrelativity followed as an attempt to put my UFT ideas into the Navier-Stokes Equations, but the layout is at a much higher academic standard. Fluid dynamics can be fun, and thinking about fluid dynamics helped me question relativity and improve my UFT mathematics [ 14 ] . My progression is from Einstein’s relativity to UFT to Superrelativity to this paper, Black Hole Shock. But, whenever I improve my equations and concepts, I am actually creating a better and better UFT. That also improves my fluid dynamics equations. I hope that dignitaries from Clay Mathematics Institute are reading Superrelativity and Black Hole Shock. I intend to create amazing equations in this paper that shrewd physics-enthusiasts should read, and have tattooed on their bodies.
1.12. Introduction: Turbulence & Kinetic Energy
Turbulence does not come from Einstein’s simple Special Relativity equations. Turbulence, caused by modifying his equations, is important to fluid dynamics and the whole universe. The modification, in Superrelativity, also superbly explains what kinetic energy is. In Black Hole Shock, I will think about turbulence and kinetic energy as I create new equations. Turbulence, kinetic energy, and acceleration are significant aspects of this universe’s mathematics.
1.13. Introduction: Exponential Energy Equation
Those turbulence and kinetic energy advancements were not my limit in superrelativity [ 1 ] . Unexpectedly, Rodgers’s Exponential Energy Equation appeared as an equational progression, my greatest mathematical creation so far. That exponential equation possesses an exquisite, symmetrical beauty attractive to a mathematician. Further, the exponential of turbulence meant that I had doubly-solved the turbulence problem. The exponential of turbulence produced more and more little turbulences. In fact, Rodgers’s Exponential Energy Equation is a succession of exponentials multiplied. These elaborate equations impress the mathematically-gifted, but Superrelativity equations simplify physics of our universe. My exponential equations are functional foundations for fluid dynamics. But, although I am very proud of Superrelativity, I am attempting to improve my equations in this new Black Hole Shock.
1.14. Introduction: Black Hole & Navier-Stokes Equations
Superrelativity’s Black Hole equations are interesting, but Superrelativity is mostly about mathematical possibilities for derivation of the mysterious Navier-Stokes Equations. The UFT I seek is never entirely unified because this universe is mathematically magnificent, very intriguing, and beyond human comprehension. The mathematics of this universe is like the skeleton of the human body. The body is greater than its skeleton, like the universe is greater than its mathematics that is innately and surprisingly great.
1.15. Introduction: Proud of Superrelativity
Superrelativity progressed my mathematical understanding in many ways. My sophisticated physics equations have inspired geniuses to congratulate me. Due to irreversibility of events with time, I can never rewrite that physics paper again, but I am very proud of my Superrelativity [ 1 ] [ 5 ] [ 6 ] . Those equations are why Black Hole Shock’s equations will be even better equations, and why I can pinpoint possible weaknesses in my thinking.
1.16. Introduction: Obsession Now Black Hole Shock
Black Hole Shock is my new obsession because, although I believed superrelativity was my intellectual perfection in physics, I experienced a dazzling inspiration, a quantum creative leap from my methodical, mathematical conjecture in Superrelativity. Publication, of my very inclusive paper, forced me to look at my equations from a myriad of paranoid perspectives. That obsessive-compulsive analysis led to two revolutionary revelations. Firstly, I introduced acceleration because acceleration does happen despite Einstein ignoring it. To my sense of mathematical symmetry, Klein-Gordon Equation and Schrodinger’s Equation both seem to be incomplete equations that can be improved. In Black Hole Shock, I want to reconsider my Superrelativity use of Schwarzs- child’s method, and attempt to better understand quantum aspects of physics. Einstein’s relativity mathematics has always been my forte as I ignored Quantum Physics that is extremely important. The Klein-Gordon Equation and the Schrodinger’s Equation deserve mathematical impact from me to improve Black Hole equations, Navier-Stokes equations, and Unified
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