Asymptotic properties of DVCS

B.I. Ermolaev; F. Olness; A.G. Shuvaev

arXiv:hep-ph/9906294·hep-ph·November 17, 2014

Asymptotic properties of DVCS

B.I. Ermolaev, F. Olness, A.G. Shuvaev

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TL;DR

This paper analyzes the asymptotic behavior of the DVCS amplitude in forward and backward scattering, employing Regge calculus to resum logarithmic contributions beyond DGLAP, revealing a power-like behavior in the forward case.

Contribution

It introduces a novel application of Regge calculus to resum logarithmic contributions in DVCS, extending beyond traditional DGLAP evolution methods.

Findings

01

Forward DVCS amplitude exhibits power-like behavior.

02

Resummation of logarithmic contributions using Regge calculus.

03

Enhanced understanding of asymptotic DVCS properties.

Abstract

We compute the deeply virtual Compton scattering (DVCS) amplitude for forward and backward scattering in the asymptotic limit. We make use of the Regge calculus to resum important logarithmic contributions that are beyond those included by the DGLAP evolution. We find a power-like behavior for the forward DVCS amplitude.

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