Differential-difference equation of the Glauber-Lachs and Peřina-McGill formula, QCD branching processes and hadronization
- 16 August 1984
- journal article
- Published by Elsevier in Physics Letters B
- Vol. 143 (4-6) , 463-470
- https://doi.org/10.1016/0370-2693(84)91503-x
Abstract
No abstract availableKeywords
This publication has 17 references indexed in Scilit:
- Why the hadronic multiplicity distributions in e+e− annihilations are so narrowPhysics Letters B, 1984
- Stochastic background of a KNO scaling function given by the Peřina-McGill formula and the gamma distribution utilized by Carruthers and Shih —their interrelation and phenomenological applicationsPhysics Letters B, 1984
- Generalization of the Glauber-Lachs Formula, Charged Particle Distributions and the KNO Scaling at p Formula ColliderProgress of Theoretical Physics, 1983
- Correlations and fluctuations in hardonic multiciplicity distribution: The meaning of KNO scalingPhysics Letters B, 1983
- Generalization of the Glauber-Lachs Formula, Charged Particle Distributions and the KNO Scaling at pFormula ColliderProgress of Theoretical Physics, 1983
- QCD jets as markov branching processes. Explicit solutions for the transition probabilitiesIl Nuovo Cimento A (1971-1996), 1981
- Inelastic distributions and color structure in perturbative QCDNuclear Physics B, 1980
- QCD jets as Markov branching processesNuclear Physics B, 1979
- Jet calculus: A simple algorithm for resolving QCD jetsNuclear Physics B, 1979
- Scaling of multiplicity distributions in high energy hadron collisionsNuclear Physics B, 1972