Bibliography#
Tip
Download this bibliography as BibTeX here.
References
K. Peters. A Primer on Partial Wave Analysis. arXiv, December 2004. arXiv:hep-ph/0412069.
R. Kutschke. An Angular Distribution Cookbook. January 1996. home.fnal.gov/~kutschke/Angdist/angdist.ps.
J. D. Richman. An Experimenter's Guide to the Helicity Formalism. June 1984. inspirehep.net/literature/202987.
H. Chen and R.-G. Ping. Coherent helicity amplitude for sequential decays. Physical Review D, 95(7):076010, April 2017. doi:10.1103/PhysRevD.95.076010.
D. Marangotto. Helicity Amplitudes for Generic Multibody Particle Decays Featuring Multiple Decay Chains. Advances in High Energy Physics, 2020:1–15, December 2020. doi:10.1155/2020/6674595.
M. Wang et al. A novel method to test particle ordering and final state alignment in helicity formalism. arXiv, December 2020. arXiv:2012.03699.
M. Mikhasenko et al. Dalitz-plot decomposition for three-body decays. Physical Review D: Particles and Fields, 101(3):034033, February 2020. doi:10.1103/PhysRevD.101.034033.
R. Aaij et al. Observation of 𝐽/𝜓 𝑝 Resonances Consistent with Pentaquark States in 𝛬𝑏⁰ → 𝐽/𝜓𝐾⁻𝑝 Decays. Physical Review Letters, 115(7):072001, August 2015. doi:10.1103/PhysRevLett.115.072001.
A. V. Anisovich et al. Moment-operator expansion for the two-meson, two-photon and fermion–antifermion states. Journal of Physics G: Nuclear and Particle Physics, 28(1):15–32, January 2002. doi:10.1088/0954-3899/28/1/302.
C. Zemach. Use of Angular-Momentum Tensors. Physical Review, 140(1B):B97–B108, October 1965. doi:10.1103/PhysRev.140.B97.
S.-U. Chung et al. Partial wave analysis in 𝐾-matrix formalism. Annalen der Physik, 507(5):404–430, May 1995. doi:10.1002/andp.19955070504.
A.M. Badalyan et al. Resonances in coupled channels in nuclear and particle physics. Physics Reports, 82(2):31–177, February 1982. doi:10.1016/0370-1573(82)90014-X.
Particle Data Group et al. Review of Particle Physics. Progress of Theoretical and Experimental Physics, 2020(8):083C01, August 2020. doi:10.1093/ptep/ptaa104.
I.J.R. Aitchison. The 𝐾-matrix formalism for overlapping resonances. Nuclear Physics A, 189(2):417–423, July 1972. doi:10.1016/0375-9474(72)90305-3.
A. D. Martin and T. D. Spearman. Elementary Particle Theory. North-Holland Pub. Co, Amsterdam, 1970. ISBN:978-0-7204-0157-8.
Further reading
C. Amsler. The Quark Structure of Hadrons: An Introduction to the Phenomenology and Spectroscopy. Number 949 in Lecture Notes in Physics. Springer International Publishing : Imprint: Springer, Cham, 1st ed. 2018 edition, October 2018. ISBN:978-3-319-98527-5. doi:10.1007/978-3-319-98527-5.
D. M. Asner et al. Dalitz Plot Analysis Formalism. In Review of Particle Physics: Volume I Reviews. January 2006. doi:10.1093/ptep/ptaa104.
E. Byckling and K. Kajantie. Particle Kinematics. Wiley, London, New York, 1973. ISBN:978-0-471-12885-4.
S.-U. Chung. Formulas for Angular-Momentum Barrier Factors (Version II). Technical Report, Brookhaven National Laboratory, March 2015. physique.cuso.ch/fileadmin/physique/document/2015_chung_brfactor1.pdf.
S.-U. Chung. Spin Formalisms (Updated Version). Technical Report, Brookhaven National Laboratory, July 2014. suchung.web.cern.ch/spinfm1.pdf.
B. Ketzer, B. Grube, and D. Ryabchikov. Light-Meson Spectroscopy with COMPASS. Progress in Particle and Nuclear Physics, December 2019. doi:10.1016/j.ppnp.2020.103755.
E. Leader. Spin in Particle Physics. Number 15 in Cambridge Monographs on Particle Physics, Nuclear Physics, and Cosmology. Cambridge University Press, Cambridge ; New York, 2001. ISBN:978-0-521-35281-9.
X.-Y. Li, X.-K. Dong, and H.-J. Jing. Spin-orbit amplitudes for decays with arbitrary spin. Nuclear Physics A, 1040:122761, December 2023. doi:10.1016/j.nuclphysa.2023.122761.
R. G. Newton. Scattering Theory of Waves and Particles. Springer, New York, 2nd edition edition, 1982. ISBN:978-3-540-10950-1.
S. Weinberg. The Quantum Theory of Fields, Volume 1: Foundations. Cambridge University Press, Cambridge ; New York, 1995. ISBN:978-0-521-55001-7.