Euclidean 4dimensional electromagnetism.docx (27,7 kB)

 

Euclidean 4dimensional electromagnetism 

Whit Time (zero point) energy

Euclidean 4dimensional electromagnetism are together whit electrogravitation and hyperspace theory a unified field theory that hopefully can describe most things. It is this theory that you use when you are constructing time (zero point) energy converters (antilenz-generators).

According to euclidean relativity everything is moving at lightspeed in the 4space according to the equation vx2+vy2+vz2+vt2=c2 where vx=dx/dT is the x-component of the velocity , vy=dy/dT is the  y-component of the velocity , vz=dz/dT is the  z-component of the velocity and vt=cdt/dT=√(c2-v2) is the time velocity ,c is the lightspeed ,t is coordinate time and T own time. Charge and current density equations becomes jx2+jy2+jz2+(ρ0vt)2=(ρ0c)2 where jx=(d2I)/(dydz) is the x-component of the current density , jy=(d2I)/(dxdz) is the y-component of the current density , jz=(d2I)/(dydx) is the z-component of the current density and ρ0=(d3Q)/(dxdydz) is the charge density where Q is the charge and I=dQ/dT is the current  Qv=Il where l is the length of the conductor

Jx=ρ0vx  Jy=ρ0vy  Jz=ρ0vz 

The magnetical fields and the electrostatical field/c becomes following

 Bxy=μ0∫jxdy      Bxz=μ0∫jxdz      Bxct=μ0∫jxcdt

Byx=μ0∫jydx      Byz=μ0∫jydz     Byct=μ0∫jycdt          

Bzx=μ0∫jzdx      Bzy=μ0∫jzdy     Bzct=μ0∫jzcdt          

Esx/c=μ0∫(ρ0vt)dx      Esy/c=μ0∫(ρ0vt)dy       Esz/c=μ0∫(ρ0vt)dz

Where Bxy is the magnetic field from currents flowing in x-direction in the y-direction , Bxz is the magnetic field from currents flowing in x-direction in the z-direction , Byx is the magnetic field from currents flowing in y-direction in the x-direction , Byz is the magnetic field from currents flowing in y-direction in the z-direction , Bzx is the magnetic field from currents flowing in z-direction in the x-direction , Bzy is the magnetic field from currents flowing in z-direction in the y-direction.

 Please observe that I am using straight field lines from the conductors instead of using concentretic rings, if you want to use concentretic rings you have to think that they are perpendicular against both the current and my straight field lines.

 Bxct is the magnetic field from currents flowing in x-direction in the time dimension , Byct is the magnetic field from currents flowing in y-direction in the time dimension , Bzct is the magnetic field from currents flowing in z-direktion in the time dimension  , Esx/c is the electrostatic field/c in the x-direction , Esy/c is the electrostatic field/c in the y-direction , Esz/c is the electrostatic field/c in the z-direction 

Φxy=∬ Bxydxdy     Φxz=∬ Bxydxdz

Φyx=∬ Bxydydx     Φyz=∬ Bxydydz

Φzx=∬ Bxydzdx     Φzy=∬ Bxydzdy

Where Φxy is the magnetic flux from currents flowing in x-direction in the xy-plane , Φxz is the magnetic flux from currents flowing in x-direction in the xz-plane , Φyx is the magnetic flux from currents flowing in y-direction in the xy-plane , Φyz is the magnetic flux from currents flowing in y-direction in the zy-plane , Φzx is the magnetic flux from currents flowing in z-direction in the xz-plane , Φzy is the magnetic flux from currents flowing in z-direction in the zy-plane

E2=Ex2+Ey2+Ez2+Ect2

Ex=∫(d(Esxcdt)/cdT)-∫(d(Byxdy)/dT)-∫(d(Bzxdz)/dT)=vt2Esx/c+∫(dEsx/(cdT))cdt-(vyByx+∫(dByx/dT)dy)- (vzBzx+∫(dBzx/dT)dz)=vt2μ0∫(ρ0vt)dx+μ0∬(d(ρ0vtdx)/dT)cdt-(vyμ0∫jydx+μ0∬(d(jydx)/dT)dy)-(vzμ0∫jzdx+μ0∬(d(jzdx)/dT)dz)

Ey=∫(d(Esycdt)/cdT)-∫(d(Bxydx)/dT)-∫(d(Bzydz)/dT)=vt2Esy/c+∫(dEsy/(cdT))cdt-(vxBxy+∫(dBxy/dT)dx)- (vzBzy+∫(dBzy/dT)dz)=vt2μ0∫(ρ0vt)dy+μ0∬(d(ρ0vtdy)/dT)cdt-(vxμ0∫jxdy+μ0∬(d(jxdy)/dT)dx)-(vzμ0∫jzdy+μ0∬(d(jzdy)/dT)dz) 

Ez=∫(d(Eszcdt)/cdT)-∫(d(Bxzdx)/dT)-∫(d(Byzdy)/dT)=vt2Esz/c+∫(dEsz/(cdT))cdt-(vxBxz+∫(dBxz/dT)dx)- (vyByz+∫(dByz/dT)dy)=vt2μ0∫(ρ0vt)dz+μ0∬(d(ρ0vtdz)/dT)cdt-(vxμ0∫jxdz+μ0∬(d(jxdz)/dT)dx)-(vyμ0∫jydz+μ0∬(d(jydz)/dT)dy)

Ect=∫(d(Bxctdx)/dT) +∫(d(Byctdy/dT) +∫(d(Bzctdz/dT)=vxBxct+∫(dBxct/dT)dx+vyByct+∫(dByct/dT)dy+vzBzct+∫(dBzct/dT)dz=vxμ0∫jxcdt+μ0∬(d(jxcdt)/dT)dx+ vyμ0∫jycdt+μ0∬(d(jycdt)/dT)dy+vzμ0∫jzcdt+μ0∬(d(jzcdt)/dT)dz

 Where E is the electric field Ex is the x-component of the electric field , Ey is the y-component of the electric field , Ez is the z-component of the electric field and Ect is the time component of the electric field. The force on a charge is F=QE

μ0 is the magnetic constant

U=∫Exdx+∫Eydy+∫Ezdz+∫Ectcdt=μ0∬(ρ0vtcdt/dT)(dx2+dy2+dz2)-μ0∬( jxdx/dT)(dy2+dz2-(cdt)2)- μ0∬( jydy/dT)(dx2+dz2-(cdt)2)- μ0∬( jzdz/dT)(dy2+dx2-(cdt)2) where U is the electric potential W=QU is the spacetime energy for the charge Q

Uct=∫Ectcdt=∫(∫(d(Bxctdx)/dT) +∫(d(Byctdy/dT) +∫(d(Bzctdz/dT))cdt=∫( vxBxct+∫(dBxct/dT)dx+vyByct+∫(dByct/dT)dy+vzBzct+∫(dBzct/dT)dz)cdt=∫( vxμ0∫jxcdt+μ0∬(d(jxcdt)/dT)dx+ vyμ0∫jycdt+μ0∬(d(jycdt)/dT)dy+vzμ0∫jzcdt+μ0∬(d(jzcdt)/dT)dz)cdt

 

Where Uct is the potential in the time dimension and Wct=QUct is the potential time energy for the charge Q

Ux=∫Exdx=∬(d(Esxcdt)/cdT)dx-∬(d(Byxdy)/dT)dx-∬(d(Bzxdz)/dT)dx=∫(vt2Esx/c)dx+∬(dEsx/(cdT))cdtdx-∫(vyByx+∫(dByx/dT)dy)dx- ∫(vzBzx+∫(dBzx/dT)dz)dx=vt2μ0∬(ρ0vt)(dx)2+μ0∭(d(ρ0vtdx)/dT)cdtdx-∫(vyμ0∫jydx+μ0∬(d(jydx)/dT)dy)dx-∫(vzμ0∫jzdx+μ0∬(d(jzdx)/dT)dz)dx=∬d(Esxcdt)/cdT)dx-dϕyx/dT- dϕzx/dT

Uy=∫Eydy=∬(d(Esycdt)/cdT)dy-∬(d(Bxydx)/dT)dy-∬(d(Bzydz)/dT)dy=∫(vt2Esy/c)dy+∬(dEsy/(cdT))cdtdy-∫(vxBxy+∫(dBxy/dT)dx)dy- ∫(vzBzy+∫(dBzy/dT)dz)dy=vt2μ0∬(ρ0vt)(dy)2+μ0∭(d(ρ0vtdy)/dT)cdtdy-∫(vxμ0∫jxdy+μ0∬(d(jxdy)/dT)dx)dy-∫(vzμ0∫jzdy+μ0∬(d(jzdy)/dT)dz)dy=∬d(Esycdt)/cdT)dy-dϕxy/dT- dϕzy/dT

 

Uz=∫Ezdz=∬(d(Eszcdt)/cdT)dz-∬(d(Bxzdx)/dT)dz-∬(d(Byzdy)/dT)dz=∫(vt2Esz/c)dz+∬(dEsz/(cdT))cdtdz-∫(vxBxz+∫(dBxz/dT)dx)dz- ∫(vyByz+∫(dByz/dT)dy)dz=vt2μ0∬(ρ0vt)(dz)2+μ0∭(d(ρ0vtdz)/dT)cdtdz-∫(vxμ0∫jxdz+μ0∬(d(jxdz)/dT)dx)dz-∫(vyμ0∫jydz+μ0∬(d(jydz)/dT)dy)dz=∬d(Eszcdt)/cdT)dz-dϕxz/dT- dϕyz/dT

U=Ux+Uy+Uz+Uct

Ux is the electric potential in x-direction

Uy is the electric potential in y-direction

Uz is the electric potential in z-direction

 

Whit this theory you can easyli see that the induction and the lenz law is coming from two fully separated magnetic fields and that is therefore by reversing the magnetic field that gives the lenz law is possible to build self powering generators that is powered by the time dimension. The equations also enables FTL communication whit rotating transmittor fields (more of that in another article where i derives the lightspeed from these equations). I think that these equations better describes electromagnetism than maxvell heavyside equations.

c2=1/(ϵ0μ0) where ϵ0 is the electric constant

 

Euclidean 4dimensional electromagnetism.docx (27,7 kB)

 

 

 

Electrogravitation.docx (17,4 kB)

 

Electrogravitation

Electromagnetism and gravitation is in fact just two sides of the same thing where the mass is m=W/c2=QU/c2 where W=QU is the four-dimensional energy of a particle whit the charge Q and is derived as follows   m=∫(FT/c)dT=∫(F/c2)dR=Q∫(E/c2)dR=(Q/c2)( ∫Exdx+∫Eydy+∫Ezdz+∫Ectcdt)= QU/c2 where  FT/F=dR/(cdT)=vr/c   where  vr is the particles relative space velocity and FT is the component of the force in the partices relative time dimension. 

F=QE  is the force   Fx=QEx is the x-component of the force  Fy=QEy is the y-component of the force     Fz=QEz is the z-component of the force and  Fct=QEct is the component of the force in the time dimension.

I have previously written that g=(FΔU/(mU0)) (where g is the gravitational field, ΔU is the voltage between the points where force and counterforce acts, m is the mass and U0 is the backgroundpotential of the Aether) but it applies only when g is the same over the whole area that F acts on. The general rule is gx=(d3FxΔU/(d3mU0))=(dPxΔU/(¤U0dx))

gy=(d3FyΔU/(d3mU0))=(dPyΔU/(¤U0dy))

gz=(d3FzΔU/(d3mU0))=(dPzΔU/(¤U0dx))

Where gx is the x-component of the gravitational field  

 gy is the y-component of the gravitational field

gz is the z-component of the gravitational field   

Px=d2Fx/(dydz) is the pressure in x-direction   Py=d2Fy/(dxdz)  is the pressure in y-direction   Pz=d2Fz/(dxdy)  is the pressure in z-direction   

And ¤=d3m/(dxdydz) is the density 

¤=ρ0U/c2 which means that the general formula for the mass becomes m=∭( ρ0U/c2)dxdydz 

The gravitational force in the different directions becomes like this:

Fgx=mgx=m(dPxΔU/(¤U0dx))=(∭¤dxdydz)(dPxΔU/(¤U0dx))=(FxΔU/U0)

Fgy=mgy=m(dPyΔU/(¤U0dy))=(∭¤dxdydz)(dPyΔU/(¤U0dy))=(FyΔU/U0)

Fgz=mgz=m(dPzΔU/(¤U0dz))=(∭¤dxdydz)(dPzΔU/(¤U0dz))=(FzΔU/U0) 

Where Fgx is the x-component of the gravitational force

Fgy is the y-component of the gravitational force

Fgz is the z-component of the gravitational force

These equations together whit euclidean 4dimensional electromagnetism and the hyperspace theory is my unified field theory.

These equations together whit euclidean 4dimensional electromagnetism, the hyperspace theory and artificial gravitation(that is just another article about electrogravitation that i have written) explains how UFOs and stargates works. You can use this theory to construct UFOs that in reality is electrogravitation and hyperspace ships.

 

Electrogravitation.docx (17,4 kB)

Derivation of the lightspeed and FTL signals.docx (14,9 kB)

 

Derivation of the lightspeed and FTL signals

In this article I derive the lightspeed and the speed of FTL signals whit euclidean 4dimensional electromagnetism

In ordinary cases whit stationary transmitter

c2=1/(ϵ0μ0)    c=Em/Bm

Em=∫(ρ0max/ ϵ0)ds=(1/ ϵ0)∫(d3Qmax/(dr1dr2ds))ds=(1/ ϵ0)(d2Qmax/(dr1dr2))

Bm=μ0∫jmaxdr1= μ0∫(d2Imax/(dr1dr2))dr1=μ0dImax/dr2= μ0(d2Qmax/(dr2dT))

ρ0= d3Qmax/(dr1dr2ds)      j= d2Imax/(dr1dr2)  

where Em is the maximum value of the alternating electric field Bm is the maximum value of the alternating magnetic field Qmax is the maximum value of the charge and Imax is the maximum value of the current.

Em/ Bm=(1/ ϵ0)(d2Qmax/(dr1dr2))/ μ0(d2Qmax/(dr2dT))= 1/(ϵ0μ0)dT/dr1=c2dT/dr1    but  c=Em/Bm  so  c= c2dT/dr1    which means that  dr1/dT=c   

dr1 dr2 and ds are three independent (perpendicular) directions ds is also current direction in the antenna. 

For rotating transmittor fields the lightspeed becomes 

c’=dr1/dt= dr1/(dT√(1-v2/c2))=c/(√(1-v2/c2)) where v is the rotational velocity.

And for rotating and translating transmittor fields the lightspeed becomes 

c’= dr’1/dt= dr1(√(1-v12/c2)/(dT√(1-(v1+v2)2/c2))=c(√(1-v12/c2)/( √(1-(v1+v2)2/c2)) where v1 is the translation velocity and v2 is the rotational velocity.

As you see is c’ often larger and sometimes smaller than c which corresponds whit the idea that it is possible to communicate whit any place in the 4space.

 

Derivation of the lightspeed and FTL signals.docx (14,9 kB)