| muon neutrino LR -
10-17-2007, 03:41 PM
In terms of space charges the muon neutrino is 3H+ and 3H-. Expressed in row matrix as [+3, -3], whose transpose is its column matrix. The product of row to column is a pure integer number 18, while the product of column to row is a multiplier 9 with the Hadamard matrix.
For 2 muon neutrinos the expression is a 2 by 2 square matrix and when multiplied by its transpose to the right the product is a 2 by 2 Hadamard matrix with a muon neutrino multiplier of 18. If the transpose operates from the left then the product is a 2 by 2 matrix with 18 as constant element values.
For 3 muon neutrinos the expression is a 2 by 3 double rows matrix and when multiplied by its transpose to the right the product is a 2 by 2 Hadamard matrix with a muon neutrino multiplier of 27. If the transpose operates from the left then the product is a 3 by 3 square matrix with 18 as constant element values.
For 4 muon neutrinos the expression is a 2 by 4 double rows matrix and when multiplied by its transpose to the right the product is a 2 by 2 Hadamard matrix with a muon neutrino multiplier of 36. If the transpose operates from the left then the product is a 4 by 4 positive definite square matrix with determinant zero and 18 as constant element values.
It is noted that the muon multiplier increases by multiples of 9 where the multiple variable is equal to the number of muon neutrino in the matrix operation.
Time independence: [∂E(g)]²=[∂F(a)×∂r(a)]·[∂F(b)×∂r(b)] and Mass independence: ¶a(t)·¶r(t)=c²
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Linear Mode
