Tomonaga's Super Multi-time Theory / Clifford Algebra Note 5 / 25 January 2008 / Note added 30 July 2014
30/07/2014 22:11
TOMONAGA’s Super Multi-time Theory / Clifford Algebra Note 5 / 25 January 2008 / Note added 30 July 2014
Note 5
TOMONAGA’s Super Multi-time Theory
1 <Schrödinger equation>
State vector ψ
Time t
Electromagnetic field A
Hamiltonian H
i
ψ(t) = Hψ(t), ψ(0) = ψ (1)

2 <Dirac’s paraphrase of Schrödinger equation >
Coordinate x
Momentum p
Electron N in number
Electromagnetic field A
H-em Electromagnetic field Hamiltonian
[ H-em +
Hn ( xn, pn, A (xn) ) +
] ψ(t) = 0 (2)



3 <Representation by unitary transformation>
u(t) = exp{
H-emt }

A (xn, t) = u(t) A (xn) u(t)-1
Φ(t) = u(t) ψ(t)
[
Hn ( xn, pn, A (xn, t) ) +
] Φ(t) = 0 (3)



4 < Dirac’s multi-time theory- Time variant in number N >
[Hn ( xn, pn, A (xn, tn) ) +
] Φ( x1, t1; … ; xN, tN ) = 0 (4)


5 <Tomonaga’s representation of electromagnetic field>
Unitary transformation
U (t) = exp {
(H1 + H2 ) t }

Schrödinger equation
[H1 + H2 + H12+
] ψ(t) = 0


Independent time variant txyz at each point in space
[ H12 (x, y, z, txyz ) +
] Φ(t) = 0 (5)


6 < Tomonaga’s super multi-time theory>
Super curved surface C
Point on C P
4-dimensional volume’s transformation of C
CP

Infinite small variation of state vectorΦ[C] = Φ[txyz]
Φ[C]

[ H12 ( P ) +
] Φ[C] = 0 (6)


[References]
<Past work on multi-time themes>
Aurora Theory / Dictoron, Time and Symmetry <Language Multi-Time Conjecture> / Tokyo October 6, 2006
<For more details>
Language and Spacetime
Source: https://www.sekinan.org/SekinanLinguisticField/CANote5TOMONAGASuperMultiTimeTheory.htm
Source: https://www.sekinan.org/SekinanLinguisticField/CANote5TOMONAGASuperMultiTimeTheory.htm
[ Note / 30 July 2014]
Tomonaga model of word is expressed by the following.
Whole of word: = C
Part of word: = P
Time at part of word: = txyz
Tomonaga model of word is expressed by the following.
Whole of word: = C
Part of word: = P
Time at part of word: = txyz
Tokyo 25 January 2008
Tokyo 30 July 2014 Note added
Tokyo 30 July 2014 Note added