A symmetry group containing both the lorentz group andSU 3

A symmetry group containing both the lorentz group andSU ₃

Il Nuovo Cimento (1955-1965)

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F. Lurcat andL. Michel:Nuovo Cimento,21, 574 (1961).
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For the use of the complex Lorentz group (2) see, for example,R. Jost: inTheoretical Physics in the 20th Century, edited byM. Fierz andF. Weisskopf (New York, 1960) orA. S. Wightman: inDispersion Relations and Elementary Particles, EditorsC. de Witt andR. Omnės (New York, 1960).
Journ. Math. Phys., (to be published).
This is an example of the known fact that to a given complex Lie algebra there may correspond more than one real Lie algebra (L. Pontrjagin:Topological Groups (Princeton, N. J., 1958), p. 265).
K. Yano andS. Bochner:Curvature and Betti Numbers, Chapter VII (Princeton, N. J., 1953).

Physics Department, University of Colorado and National Bureau of Standards, Boulder, Colo.
A. O. Barut

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A. O. Barut
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Supported in part by the Air Force Office of Scientific Research and National Science Foundation.

Barut, A.O. A symmetry group containing both the lorentz group andSU ₃ . Nuovo Cim 32, 234–236 (1964). https://doi.org/10.1007/BF02732608

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