Enlarged Distance Theory
For CELAN Paul
Ansprache anläβlich der Entgegennahme des Literaturpreises der Freien Hansestadt
1 Language was supposed to have distance for mainly making sentence.
Refer to the following paper under roughly sketched situation.
Distance Theory Tokyo May 5, 2004
2 Distance in 4 dimensional space is indicated by Minkowski space.
(Δs)2≡(cΔt)2-(Δx)2-(Δy)2-(Δz)2
Δs is distance. c is light velocity. Δt = t2-t1. Δx = x2-x1. Δy = y2-y1 Δz = z2-z1.
3 Now if time is imaginary time it by being showed from HAWKING S., distance is indicated by
-(Δs)2≡(cΔt)2+(Δx)2+(Δy)2+(Δz)2
Here distance (Δs) becomes imaginary number.
This distance means that 4 dimensional space has imaginary number’s distance. The distance is abbreviated to imaginary distance.
Imaginary distance is in imaginary space.
Refer to the following paper.
Aurora Time Theory Imaginary Time and Imaginary Space Tokyo From HAWKING Stephen November 11, 2006
4 Imaginary distance is interpreted by the following.
4-1 On complex plane imaginary number is objected to the circle that is expressed by y2 + z2 = 1.
The circle is called to imaginary ring.
Aurora Theory Aurora and Riemann Sphere For Mason L. J. Tokyo October 2-3, 2006
4-2 Imaginary ring expresses point at infinity of hyperboloid by Caley transformation.
4-3 In consequence, on point at infinity, imaginary distance is expressed on the circle.
4-4 In 4 dimensional space, on point at infinity, the imaginary distance is expressed on a circle.
5 Thus supposion is the following.
In 4 dimensional space, distance on point at infinity is definitely expressed by HAWKING’s imaginary time.
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