Lorentz deformation in the O(4) and light-cone coordinate systems
Publication
, Journal Article
Kim, YS; Noz, ME; Oh, SH
Published in: Journal of Mathematical Physics
January 1, 1979
A formalism is developed for describing Lorentz deformation properties of extended hadrons in terms of solutions of the harmonic oscillator equation in the O(4) and light-cone coordinate systems. The physical hadronic wave function discussed in previous papers is written as a linear expansion of orthonormal functions in those coordinates which form representations of compact groups. The separability of the oscillator equation is shown to play the essential role in developing the proposed mathematics. © 1980 American Institute of Physics.
Duke Scholars
Published In
Journal of Mathematical Physics
DOI
ISSN
0022-2488
Publication Date
January 1, 1979
Volume
21
Issue
5
Start / End Page
1224 / 1228
Related Subject Headings
- Mathematical Physics
- 02 Physical Sciences
- 01 Mathematical Sciences
Citation
APA
Chicago
ICMJE
MLA
NLM
Kim, Y. S., Noz, M. E., & Oh, S. H. (1979). Lorentz deformation in the O(4) and light-cone coordinate systems. Journal of Mathematical Physics, 21(5), 1224–1228. https://doi.org/10.1063/1.524513
Kim, Y. S., M. E. Noz, and S. H. Oh. “Lorentz deformation in the O(4) and light-cone coordinate systems.” Journal of Mathematical Physics 21, no. 5 (January 1, 1979): 1224–28. https://doi.org/10.1063/1.524513.
Kim YS, Noz ME, Oh SH. Lorentz deformation in the O(4) and light-cone coordinate systems. Journal of Mathematical Physics. 1979 Jan 1;21(5):1224–8.
Kim, Y. S., et al. “Lorentz deformation in the O(4) and light-cone coordinate systems.” Journal of Mathematical Physics, vol. 21, no. 5, Jan. 1979, pp. 1224–28. Scopus, doi:10.1063/1.524513.
Kim YS, Noz ME, Oh SH. Lorentz deformation in the O(4) and light-cone coordinate systems. Journal of Mathematical Physics. 1979 Jan 1;21(5):1224–1228.
Published In
Journal of Mathematical Physics
DOI
ISSN
0022-2488
Publication Date
January 1, 1979
Volume
21
Issue
5
Start / End Page
1224 / 1228
Related Subject Headings
- Mathematical Physics
- 02 Physical Sciences
- 01 Mathematical Sciences