New Families of Scaling Multiparticle Distributions
Abstract
Recently equations for the generating functional in the perturbative quantum chromodynamics (QCD) have been extended by including the non-perturbative dissipation in QCD jets. The resulting equations have been solved rigorously and new family of scaling solutions, the so-called delta - scaling, generalizing the well-known Kubo-Nielsen-Olesen scaling law for hadron multiplicity distributions have been found. The relevance of delta - scaling is discussed in the Landau - Ginzburg theory of phase transitions. Preliminary application of these ideas to the p p data of the UA5 Collaboration is presented.
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