TITLE:
Superrelativity
AUTHORS:
Peter Donald Rodgers
KEYWORDS:
Superrelativity, Relativity, Navier-Stokes Equation, Physics, Albert Einstein, Stephen Hawking, Black Hole, Clay Mathematics Institute
JOURNAL NAME:
Open Journal of Fluid Dynamics,
Vol.6 No.2,
June
30,
2016
ABSTRACT: Did any physics experts expect SUPERRELATIVITY paper, a physics revolution producing the
EINSTEIN-RODGERS RELATIVITY EQUATION, producing the HAWKING-RODGERS BLACK HOLE
RADIUS, and producing the STEFAN-BOLTZMANN-SCHWARZSCHILD-HAWKING-RODGERS BLACK
HOLE RADIATION POWER LAW, as the author gave a solution to The Clay Mathematics Institute’s
very difficult problem about the Navier-Stokes Equations? The Clay Mathematics Institute in May
2000 offered that great $million prize to the first person providing a solution for a specific statement
of the problem: “Prove or give a counter-example of the following statement: In three space
dimensions and time, given an initial velocity field, there exists a vector velocity and a scalar
pressure field, which are both smooth and globally defined, that solve the Navier-Stokes Equations.”
Did I, the creator of this paper, expect SUPERRELATIVITY to become a sophisticated conversion
of my unified field theory ideas and mathematics into a precious fluid dynamics paper to
help mathematicians, engineers and astro-physicists? [1]. Yes, but I did not expect such superb
equations that can be used in medicine or in outer space! In this paper, complicated equations for
multi-massed systems become simpler equations for fluid dynamic systems. That simplicity is
what is great about the Navier-Stokes Equations. Can I delve deeply into adding novel formulae
into the famous Schwarzschild’s equation? Surprisingly, yes I do! Questioning the concept of reversibility
of events with time, I suggest possible 3-dimensional and 4-dimensional co-ordinate
systems that seem better than what Albert Einstein used, and I suggest possible modifications to
Maxwell’s Equations. In SUPERRELATIVITY, I propose that an error exists in Albert Einstein’s Special
Relativity equations, and that error is significant because it leads to turbulence in the universe’s
fluids including those in our human bodies. Further, in SUPERRELATIVITY, after I create
Schwarzschild-based equations that enable easy derivation of the Navier-Stokes Equations, I suddenly
create very interesting exponential energy equations that simplify physics equations, give a
mathematical reason for turbulence in fluids, give a mathematical reason for irreversibility of
events with time, and enable easy derivation of the Navier-Stokes Equations. Importantly, my new
exponential Navier-Stokes Equations are actually wave equations as should be used in Fluid Dynamics.
Thrilled by my success, I challenge famous equations by Albert Einstein and Stephen
Hawking [2] [3].