References
D. M. Lipkin:Journ. Math. Phys.,5, 696 (1964).
T. A. Morgan:Journ. Math. Phys.,5, 1659 (1964).
D. M. Fradkin:Journ. Math. Phys.,6, 879 (1965).
D. W. B. Kibble:Conservation Laws for Free Fields, Imperial College, London, I.C.T.P. 64/65.
D. B. Fairlie:Nuovo Cimento,37, 898 (1965).
D. J. Candlin:Nuovo Cimento,37, 1390 (1965).
R. F. O’Connell andD. R. Tompkins:Generalized Solutions for Massless Free Fields and Consequent Generalized Conservation Laws, inJourn. Math. Phys. (in press).
R. F. O’Connell andD. R. Tompkins:Generalized Conservation Laws for Free Fields with Mass, inNuovo Cimento (in press).
R. H. Good jr.:Phys. Rev.,105, 1914 (1957);C. L. Hammer andR. H. Good jr.:Phys. Rev.,108, 882 (1957).
V. Bargmann andE. P. Wigner:Proc. Nat. Acad. Sci. U. S.,34, 211 (1948).
We have absorbed the operatorO which appears in the corresponding equation in ref. (4) intoV″.
A. I. Akhiezer andV. B. Berestetsky:Quantum Electrodynamics (United States Atomic Energy Commission translation 2876), p. 176.
T. A. Morgan andD. W. Joseph:Tensor Lagrangians and Generalized Conservation Laws for Free Fields (preprint).
Author information
Authors and Affiliations
Additional information
Research sponsored by the U.S. Atomic Energy Commission under contract with the Union Carbide Corporation.
Rights and permissions
About this article
Cite this article
O’Connell, R.F., Tompkins, D.R. Physical interpretation of generalized conservation laws. Nuovo Cim 39, 391–394 (1965). https://doi.org/10.1007/BF02814297
Received:
Published:
Issue Date:
DOI: https://doi.org/10.1007/BF02814297