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Bibliographic Details
Main Author: Levin, Eugene
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2410.22095
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author Levin, Eugene
author_facet Levin, Eugene
contents The main goal of the paper is to show that we can treat the $1/N_c$ QCD corrections in the Pomeron calculus. We develop the one dimensional model which is a simplification of the QCD approach that includes $\pom \to 2 \pom$, $2 \pom \to \pom$ and $ 2 \pom \to 2 \pom$ vertices and gives the description of the high energy interaction, both in the framework of the parton cascade and in the Pomeron calculus. In this model we show that the scattering amplitude can be written as the sum of Green's function of $n$ Pomeron exchanges $G_{n \pom} \propto e^{ ω_n \Y}$ with $ω_n =κ\,n^2$ at $κ\ll 1$. This means that choosing $κ= 1/N^2_c$ we can reproduce the intercepts of QCD in $1/N_c$ order. The scattering amplitude is an asymptotic series that cannot be sum using Borel approach. We found a general way of summing such series. In addition to the positive eigenvalues we found the set of negative eigenvalues which corresponds to the partonic description of the scattering amplitude. Using Abramowsky, Gribov and Kancheli cutting rules we found the multiplicity distributions of the produced dipoles as well as their entropy $S_E$.
format Preprint
id arxiv_https___arxiv_org_abs_2410_22095
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Can $1/N_c$ corrections be treated in the Pomeron calculus?
Levin, Eugene
High Energy Physics - Phenomenology
The main goal of the paper is to show that we can treat the $1/N_c$ QCD corrections in the Pomeron calculus. We develop the one dimensional model which is a simplification of the QCD approach that includes $\pom \to 2 \pom$, $2 \pom \to \pom$ and $ 2 \pom \to 2 \pom$ vertices and gives the description of the high energy interaction, both in the framework of the parton cascade and in the Pomeron calculus. In this model we show that the scattering amplitude can be written as the sum of Green's function of $n$ Pomeron exchanges $G_{n \pom} \propto e^{ ω_n \Y}$ with $ω_n =κ\,n^2$ at $κ\ll 1$. This means that choosing $κ= 1/N^2_c$ we can reproduce the intercepts of QCD in $1/N_c$ order. The scattering amplitude is an asymptotic series that cannot be sum using Borel approach. We found a general way of summing such series. In addition to the positive eigenvalues we found the set of negative eigenvalues which corresponds to the partonic description of the scattering amplitude. Using Abramowsky, Gribov and Kancheli cutting rules we found the multiplicity distributions of the produced dipoles as well as their entropy $S_E$.
title Can $1/N_c$ corrections be treated in the Pomeron calculus?
topic High Energy Physics - Phenomenology
url https://arxiv.org/abs/2410.22095