From: joshua herman <[EMAIL PROTECTED]>
Date: Sun Feb 23, 2003 11:09:57 PM Etc/GMT
To: [EMAIL PROTECTED]
Subject: A game of chess in N and 1/2 Dimentions with curvature Or Proof of the Blue Rose Conjecture (Kullishnikov-Herman Theorm or The why don't we Do it In the Road Theorm)
I sent this to a number of people to try to disprove it/ prove it.
You are the next to last Iteration of this function. Have a nice day
On Sunday, February 23, 2003, at 09:48 PM, joshua herman wrote:
Proof of harmonic Functions Over 4(Possiblly N) dimentions
Basically take a game of chess. You take that game of chess and play it out right? A requirement of the game is that you need checkmate to win. SO YOU NEED AT LEAST TWO PIECES TO GET MATE. This is very important later in the explaination.
Next take all of that physics stuff that you lear/n/ed in school and apply it to the chess board.
(Einsteins Field Equasions / Electric field equasions etc.....)
Now take the game of chess and put the king with a ring of pawns around it. Take the two knights and put that on the higher chess board. Take the 2 Bishops and put it on the next higher chess board
Each Level of the chess board represents a energy level in physics.
Now here is the tricky part how to win every single GAME. Take the function Intragal( limit at Z and negative Z (Summation to infinity with iterated variables at N and A ((D^n)a Over (dt^2)dz over dt) and graph it on a really fast moby like for example a computer near me (Argonne National Lab's Computer). You can use this function to find patterns that will win the game ( that have definite solutions) or that have unpredictable solutions.
Now Here is the part i forgot to put on slashdot. Well Take the Continuious function and it shows patterns in N dimentions. To solve the game all you have to do is take all of the vectors in the game give them a vector and execute that function generalized to that vector. The only disproof of the theorm is the nonexistance of the game and since I just proved that the game exists I can Formally call it a proof. Also You have a something called a Nash equilibrium Point ( Whatever that is????) in the middle of the board and the geometry of the board has hyperbolic curvature.
Now the last part. If you take this game and make the vectors totally random you can generalize it to the game of LOVE. Take two people with knowledge vectors of Z where z equals yi plus X and then iterate the function. This is why people fade / fade out of love and when 2 people are isolated in a island then they start to fall in love etc.... You could apply this to something called the stock market and make a killing ( look out for the fifalde general market fund)
