Bunching parameter

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In statistics as applied in particular in particle physics, when fluctuations of some observables are measured, it is convenient to transform the multiplicity distribution to the bunching parameters:

$\eta_q = \frac{q}{q-1}\frac{P_q P_{q-2}} {P_{q-1}^2},$

where $P n$ is probability of observing $n$ objects inside of some phase space regions. The bunching parameters measure deviations of the multiplicity distribution $P n$ from a Poisson distribution, since for this distribution

η q = 1

Uncorrelated particle production leads to the Poisson statistics, thus deviations of the bunching parameters from the Poisson values mean correlations between particles and dynamical fluctuations.

Normalised factorial moments have also similar properties. They are defined as

$F_q =\langle n \rangle^{-q} \sum^{\infty}_{n=q} \frac{n!}{(n-q)!} P_n.$

[edit] References

[1] Bunching Parameter and Intermittency in High-Energy Collisions;

Authors: S.V.Chekanov and V.I.Kuvshinov; Ref: Acta Phys. Pol. B25 (1994) p.1189-1197

[2] Multifractal Multiplicity Distribution in Bunching-Parameter Analysis; Authors: S.V.Chekanov and V.I.Kuvshinov;

Ref: J. Phys G22 (1996), p.601-610

[3] Generalized Bunching Parameters and Multiplicity Fluctuations in Restricted Phase-Space Bins;

Authors: S.V.Chekanov, W.Kittel and V.I.Kuvshinov; Ref: Z. Phys. C74 (1997) p.517-529

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Categories: Particle physics | Statistical mechanics

Bunching parameter

From Wikipedia, the free encyclopedia

[edit] References

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