Authors: Nicolae Mazilu
There is still much unfinished work, and understanding, in order to set the classical theory of light and colors on a physically firm basis. The present work advances a point of view touching this issue. The main starting thesis is that the Planck’s physical theory of light carries a special meaning, which allows us to select the general algebra to be used in treating the classical geometry of colors. This algebra is the one related to the SL(2,R) Lie group. In this framework, the classical MacAdam ellipse representing the uncertainty in deciding a color within trichromatic theory of colors, is closely related to the classical Hannay angle. This relation is explained. Further on, a special representation of trichromacy can result in a special representation of QCD itself. According to this representation, the QCD can be considered as the quantum counterpart of the classical theory of colors, much in the same manner in which the quantum mechanics is considered the quantum counterpart of the classical mechanics.
Comments: 11 Pages.
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[v1] 2013-04-26 09:59:06
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