Prog. Theor. Phys. Vol. 33 No. 2 (1965) pp. 319-321
On the McGlinn Theorem
The Institute for Advanced Study, Princeton, New Jersey, U.S.A.
(Received November 5, 1964)
The McGlinn theorem, concerning the relation between the Poincaré group and the symmetry group of elementary particle interactions, has been proved under weaker conditions. It is shown that the consideration of covariance simplifies the proof.
DOI : 10.1143/PTP.33.319
W. D. McGlinn, Phys. Rev. Lett. 12 (1964), 469[APS].
F. Coester, M. Hamermesh and W. D. McGlinn, Phys. Rev. 135 (1964), B451[APS].
O. W. Greenberg, Phys. Rev. 135 (1964), B1447[APS].
M. E. Mayer, H. J. Schnitzer, E. C. G. Sudarshan, R. Acharya and M. Y. Han, Concerning Space-time and Symmetry Group (preprint 1964).
Alf Beskow and Ulf Ottoson, On the Problem of Combining the Inhomogeneous Lorentz Group with a Lie Group (preprint 1964).
L. Michel, Lecture given at the Symposium on Lorentz Group, Boulder, Colorado (1964).
- Y. Tomozawa, Internal Symmetry and the Poincaré Group (preprint 1964), submitted to J. Math Phys.
- In reference 1), the statement (a) of the theorem has been assumed from the beginning.
The author is indebted to Dr. W. D. McGlinn for a communication to clarify this point.
- We use the same notation as used in reference 3), unless otherwise stated.
Citing Article(s) :
Progress of Theoretical Physics Vol. 35 No. 2 (1966) pp. 315-329
Split Extension of Internal Symmetry Group by the Poincaré Group