Wednesday, November 17, 2004

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4-Scalar Position

A four scalar position will follow basic scalar rules, exept for some other things. For example, a regular scalar will follow. For example, it still follows the scalar field law. But, if you just multipy the scalar with the dt, then you have a four scalar position. For example:

dt/k*(x)=dt'/k*(x)'

where k(x) is the scalar, and it is going under a transformation. Now, since according to dynamical law 3, all calculations end up as 0. But see, the scalar can't=0. So, it's not the complete picture. It's only the world line. In order to sustain dynamical law 3, we will have to augment some of the inertial coordinates with sets of equations.

Mathematical Field behind Light Cone research

ALGEBRAIC GEOMETRICAL TOPOLOGY:
The study of sigisars, equation of fold, Grasp Equations, Ghosts, and the application of algebraic geometry with topology. Can either be applied or pure mathematics.
SUB SECTIONS OF ALGEBRAIC GEOMETRICAL TOPOLOGY:
GHOST ANALYST
SINGULAR JUMPING ANALYST
ANALYST OF INTEGRAL DIMENSIONS
TOPOLOGY OF GRASP EQUATION MODELS
TOPOLOGY OF EQUATION OF FOLDS
TOPOLOGY OF SIGISAUROUS FIELDS
GEOMETRY OF SIGISAUROUS FIELDS
GEOMETRY OF EQUATION OF FOLDS
GEOMETRY OF GRASP EQUATIONS
AND ANYTHING ELSE THAT WILL BE BROUGHT OUT OF THIS FIELD OF STUDY AND OTHER MATHEMATICAL TOOLS THAT WILL ALLOY ALGEBRAIC GEOMETRICAL TOPOLOGIST TO DESCRIBE THE IMPOSSIBLE.

Now, what this means is that a light cone (according to dynamical law 2) can fold into a ghost, and with the field of mathematics, we will be able to properly describe light cones and space-time.



posted by Michael at Wednesday, November 17, 2004 0 comments

Light Cone Dynamical Laws

1.Geometry of a light cone consists of one geometrical singularity and past and future cones.

2.A light cone bends topilogically with space-time.

3.All inertial coordinates and general coordinates=0 at the end of calculation.

4.A world line will be described by a 4-scalar position.

5.A light cone may have a negative genus, or an infinite genus, or may take the form of N-D, depending upon the space-time that you are working with.

6.Any null plane (or surface) on a light cone is at a 45 degree angle, and spacially, 90 degrees.

7.Time on a light cone can go along any axis (even a null plane or surface).


Now, please post any comments on my shout box that is at the bottom. This is where you will publish any ideas(mini) on light cones, or any other space-time physical or mathematical happenings. (For full arguments, please give me your e-mail adress, and if you MSN, I'll put on my contact list, and put the other person, and we can have arguments).
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